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	<h1 id="top">
	Iozone results for frewrite, data are arranged by file size
	</h1>
	<DL class="filelist"><DT><STRONG>Baseline data set</STRONG><UL><LI>./ext4/ext4_1.iozone<LI>./ext4/ext4_2.iozone<LI>./ext4/ext4_3.iozone<LI>./ext4/ext4_4.iozone<LI>./ext4/ext4_5.iozone</UL><DT><STRONG>Investigated data set</STRONG><UL><LI>./xfs/xfs1.iozone<LI>./xfs/xfs2.iozone<LI>./xfs/xfs3.iozone<LI>./xfs/xfs4.iozone<LI>./xfs/xfs5.iozone</UL></DL><p>mean => Arithmetic mean<br>standar dev. => Sample standard deviation<br>ci. max 90%, ci.min => confidence interval at confidence level 90% => it means that mean value of the distribution lies with 90% propability in interval ci_min-ci_max<br>geom. mean => Geometric mean<br>median => Second quartile = cuts data set in half = 50th percentile <br>first quartile => cuts off lowest 25% of data = 25th percentile <br>third quartile => cuts off highest 25% of data, or lowest 75% = 75th percentile <br>minimum => Lowest value of data set <br>maximum => Hightest value of data set <br>baseline set1 difference => Difference of medians of both sets in percennt. Arithmetic means are used in detail mode instead.<br>ttest p-value => Student's t-test p-value = probability the both data sets are equal <br>ttest equality => If p-value is higher than 0.1, data sets are considered being equal with 90% probability. Otherwise the data sets are considered being different.<br>Linear regression of all results regression line is in y = ax form, b coeficient is zero. </p><p>for details about operations performed see <a href="http://www.iozone.org/docs/IOzone_msword_98.pdf">Iozone documentation</a></p><a name="4"></a> 
<img src="4.png" alt="4" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="1">Block size [kB]</td>
</tr>
<tr><td>4</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>4</td><td>298.95</td></tr>
<tr><td>4</td><td>298.95</td></tr>
<tr><td>4</td><td>304.5</td></tr>
<tr><td>4</td><td>228.17</td></tr>
<tr><td>4</td><td>228.17</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>271.75</td>
</tr>
<tr>
<td>standard dev.</td>
<td>39.84</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>233.76</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>309.73</td>
</tr>
<tr>
<td>geom. mean</td>
<td>269.31</td>
</tr>
<tr>
<td>median</td>
<td>298.95</td>
</tr>
<tr>
<td>first quartile</td>
<td>228.17</td>
</tr>
<tr>
<td>third quartile</td>
<td>298.95</td>
</tr>
<tr>
<td>minimum</td>
<td>228.17</td>
</tr>
<tr>
<td>maximum</td>
<td>304.5</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>4</td><td>433.37</td></tr>
<tr><td>4</td><td>357.68</td></tr>
<tr><td>4</td><td>433.37</td></tr>
<tr><td>4</td><td>322.48</td></tr>
<tr><td>4</td><td>433.37</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>396.06</td>
</tr>
<tr>
<td>standard dev.</td>
<td>52.59</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>345.92</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>446.2</td>
</tr>
<tr>
<td>geom. mean</td>
<td>393.11</td>
</tr>
<tr>
<td>median</td>
<td>433.37</td>
</tr>
<tr>
<td>first quartile</td>
<td>357.68</td>
</tr>
<tr>
<td>third quartile</td>
<td>433.37</td>
</tr>
<tr>
<td>minimum</td>
<td>322.48</td>
</tr>
<tr>
<td>maximum</td>
<td>433.37</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>45.74 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0029</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
</tr>
</table>
<a name="8"></a> 
<img src="8.png" alt="8" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="2">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>8</td><td>521.74</td><td>490.5</td></tr>
<tr><td>8</td><td>490.5</td><td>368.98</td></tr>
<tr><td>8</td><td>483.26</td><td>432.26</td></tr>
<tr><td>8</td><td>521.74</td><td>356.93</td></tr>
<tr><td>8</td><td>410.6</td><td>391.0</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>485.57</td>
<td>407.93</td>
</tr>
<tr>
<td>standard dev.</td>
<td>45.46</td>
<td>54.35</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>442.22</td>
<td>356.12</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>528.91</td>
<td>459.75</td>
</tr>
<tr>
<td>geom. mean</td>
<td>483.76</td>
<td>405.16</td>
</tr>
<tr>
<td>median</td>
<td>490.5</td>
<td>391.0</td>
</tr>
<tr>
<td>first quartile</td>
<td>483.26</td>
<td>368.98</td>
</tr>
<tr>
<td>third quartile</td>
<td>521.74</td>
<td>432.26</td>
</tr>
<tr>
<td>minimum</td>
<td>410.6</td>
<td>356.93</td>
</tr>
<tr>
<td>maximum</td>
<td>521.74</td>
<td>490.5</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>8</td><td>715.37</td><td>609.01</td></tr>
<tr><td>8</td><td>700.08</td><td>521.74</td></tr>
<tr><td>8</td><td>557.22</td><td>490.5</td></tr>
<tr><td>8</td><td>715.37</td><td>521.74</td></tr>
<tr><td>8</td><td>715.37</td><td>483.26</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>680.68</td>
<td>525.25</td>
</tr>
<tr>
<td>standard dev.</td>
<td>69.33</td>
<td>50.03</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>614.58</td>
<td>477.55</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>746.78</td>
<td>572.94</td>
</tr>
<tr>
<td>geom. mean</td>
<td>677.57</td>
<td>523.44</td>
</tr>
<tr>
<td>median</td>
<td>715.37</td>
<td>521.74</td>
</tr>
<tr>
<td>first quartile</td>
<td>700.08</td>
<td>490.5</td>
</tr>
<tr>
<td>third quartile</td>
<td>715.37</td>
<td>521.74</td>
</tr>
<tr>
<td>minimum</td>
<td>557.22</td>
<td>483.26</td>
</tr>
<tr>
<td>maximum</td>
<td>715.37</td>
<td>609.01</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>40.18 % </td>
<td>28.76 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0008</td>
<td>0.0075</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="16"></a> 
<img src="16.png" alt="16" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="3">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>16</td><td>676.98</td><td>821.19</td><td>782.0</td></tr>
<tr><td>16</td><td>650.12</td><td>575.86</td><td>538.04</td></tr>
<tr><td>16</td><td>706.16</td><td>772.78</td><td>782.0</td></tr>
<tr><td>16</td><td>504.88</td><td>782.0</td><td>602.32</td></tr>
<tr><td>16</td><td>650.12</td><td>580.96</td><td>319.99</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>637.65</td>
<td>706.56</td>
<td>604.87</td>
</tr>
<tr>
<td>standard dev.</td>
<td>77.75</td>
<td>118.4</td>
<td>192.6</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>563.53</td>
<td>593.68</td>
<td>421.25</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>711.78</td>
<td>819.44</td>
<td>788.49</td>
</tr>
<tr>
<td>geom. mean</td>
<td>633.48</td>
<td>698.29</td>
<td>576.02</td>
</tr>
<tr>
<td>median</td>
<td>650.12</td>
<td>772.78</td>
<td>602.32</td>
</tr>
<tr>
<td>first quartile</td>
<td>650.12</td>
<td>580.96</td>
<td>538.04</td>
</tr>
<tr>
<td>third quartile</td>
<td>676.98</td>
<td>782.0</td>
<td>782.0</td>
</tr>
<tr>
<td>minimum</td>
<td>504.88</td>
<td>575.86</td>
<td>319.99</td>
</tr>
<tr>
<td>maximum</td>
<td>706.16</td>
<td>821.19</td>
<td>782.0</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>16</td><td>602.32</td><td>966.53</td><td>980.99</td></tr>
<tr><td>16</td><td>782.0</td><td>105.57</td><td>1043.47</td></tr>
<tr><td>16</td><td>596.84</td><td>746.38</td><td>102.91</td></tr>
<tr><td>16</td><td>821.19</td><td>706.16</td><td>980.99</td></tr>
<tr><td>16</td><td>602.32</td><td>746.38</td><td>676.98</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>680.93</td>
<td>654.2</td>
<td>757.07</td>
</tr>
<tr>
<td>standard dev.</td>
<td>111.04</td>
<td>323.36</td>
<td>392.63</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>575.07</td>
<td>345.91</td>
<td>382.74</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>786.8</td>
<td>962.49</td>
<td>1131.4</td>
</tr>
<tr>
<td>geom. mean</td>
<td>673.96</td>
<td>525.67</td>
<td>587.45</td>
</tr>
<tr>
<td>median</td>
<td>602.32</td>
<td>746.38</td>
<td>980.99</td>
</tr>
<tr>
<td>first quartile</td>
<td>602.32</td>
<td>706.16</td>
<td>676.98</td>
</tr>
<tr>
<td>third quartile</td>
<td>782.0</td>
<td>746.38</td>
<td>980.99</td>
</tr>
<tr>
<td>minimum</td>
<td>596.84</td>
<td>105.57</td>
<td>102.91</td>
</tr>
<tr>
<td>maximum</td>
<td>821.19</td>
<td>966.53</td>
<td>1043.47</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>6.79 % </td>
<td>-7.41 % </td>
<td>25.16 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.4956</td>
<td>0.7426</td>
<td>0.4588</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
</tr>
</table>
<a name="32"></a> 
<img src="32.png" alt="32" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="4">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>32</td><td>892.83</td><td>972.3</td><td>1112.61</td><td>1112.61</td></tr>
<tr><td>32</td><td>639.98</td><td>979.57</td><td>869.14</td><td>762.91</td></tr>
<tr><td>32</td><td>846.69</td><td>193.95</td><td>825.36</td><td>1112.61</td></tr>
<tr><td>32</td><td>546.58</td><td>666.0</td><td>805.08</td><td>762.91</td></tr>
<tr><td>32</td><td>846.69</td><td>820.2</td><td>1076.07</td><td>762.91</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>754.55</td>
<td>726.4</td>
<td>937.65</td>
<td>902.79</td>
</tr>
<tr>
<td>standard dev.</td>
<td>152.05</td>
<td>324.23</td>
<td>145.47</td>
<td>191.54</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>609.59</td>
<td>417.28</td>
<td>798.96</td>
<td>720.18</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>899.52</td>
<td>1035.53</td>
<td>1076.35</td>
<td>1085.4</td>
</tr>
<tr>
<td>geom. mean</td>
<td>741.32</td>
<td>632.1</td>
<td>928.86</td>
<td>887.2</td>
</tr>
<tr>
<td>median</td>
<td>846.69</td>
<td>820.2</td>
<td>869.14</td>
<td>762.91</td>
</tr>
<tr>
<td>first quartile</td>
<td>639.98</td>
<td>666.0</td>
<td>825.36</td>
<td>762.91</td>
</tr>
<tr>
<td>third quartile</td>
<td>846.69</td>
<td>972.3</td>
<td>1076.07</td>
<td>1112.61</td>
</tr>
<tr>
<td>minimum</td>
<td>546.58</td>
<td>193.95</td>
<td>805.08</td>
<td>762.91</td>
</tr>
<tr>
<td>maximum</td>
<td>892.83</td>
<td>979.57</td>
<td>1112.61</td>
<td>1112.61</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>32</td><td>944.28</td><td>1122.14</td><td>1300.24</td><td>972.3</td></tr>
<tr><td>32</td><td>649.5</td><td>1076.07</td><td>979.57</td><td>1250.62</td></tr>
<tr><td>32</td><td>944.28</td><td>758.49</td><td>917.83</td><td>841.25</td></tr>
<tr><td>32</td><td>636.87</td><td>762.91</td><td>1250.62</td><td>869.14</td></tr>
<tr><td>32</td><td>624.73</td><td>820.2</td><td>917.83</td><td>1313.27</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>759.93</td>
<td>907.96</td>
<td>1073.22</td>
<td>1049.32</td>
</tr>
<tr>
<td>standard dev.</td>
<td>168.52</td>
<td>176.93</td>
<td>187.13</td>
<td>219.02</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>599.27</td>
<td>739.28</td>
<td>894.81</td>
<td>840.51</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>920.59</td>
<td>1076.65</td>
<td>1251.63</td>
<td>1258.13</td>
</tr>
<tr>
<td>geom. mean</td>
<td>745.6</td>
<td>894.63</td>
<td>1060.58</td>
<td>1031.48</td>
</tr>
<tr>
<td>median</td>
<td>649.5</td>
<td>820.2</td>
<td>979.57</td>
<td>972.3</td>
</tr>
<tr>
<td>first quartile</td>
<td>636.87</td>
<td>762.91</td>
<td>917.83</td>
<td>869.14</td>
</tr>
<tr>
<td>third quartile</td>
<td>944.28</td>
<td>1076.07</td>
<td>1250.62</td>
<td>1250.62</td>
</tr>
<tr>
<td>minimum</td>
<td>624.73</td>
<td>758.49</td>
<td>917.83</td>
<td>841.25</td>
</tr>
<tr>
<td>maximum</td>
<td>944.28</td>
<td>1122.14</td>
<td>1300.24</td>
<td>1313.27</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>0.71 % </td>
<td>24.99 % </td>
<td>14.46 % </td>
<td>16.23 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.959</td>
<td>0.3037</td>
<td>0.2368</td>
<td>0.2928</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
</tr>
</table>
<a name="64"></a> 
<img src="64.png" alt="64" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="5">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>64</td><td>907.68</td><td>880.25</td><td>1226.08</td><td>1426.2</td><td>1388.43</td></tr>
<tr><td>64</td><td>644.4</td><td>762.48</td><td>822.27</td><td>1024.78</td><td>960.92</td></tr>
<tr><td>64</td><td>308.11</td><td>975.22</td><td>1203.57</td><td>1359.63</td><td>1325.26</td></tr>
<tr><td>64</td><td>276.58</td><td>792.44</td><td>822.27</td><td>1359.63</td><td>960.92</td></tr>
<tr><td>64</td><td>978.86</td><td>1041.06</td><td>960.92</td><td>1388.43</td><td>993.7</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>623.13</td>
<td>890.29</td>
<td>1007.02</td>
<td>1311.73</td>
<td>1125.85</td>
</tr>
<tr>
<td>standard dev.</td>
<td>326.84</td>
<td>118.27</td>
<td>198.12</td>
<td>162.72</td>
<td>212.48</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>311.52</td>
<td>777.53</td>
<td>818.13</td>
<td>1156.59</td>
<td>923.27</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>934.73</td>
<td>1003.05</td>
<td>1195.91</td>
<td>1466.87</td>
<td>1328.42</td>
</tr>
<tr>
<td>geom. mean</td>
<td>546.6</td>
<td>884.05</td>
<td>991.61</td>
<td>1302.67</td>
<td>1110.43</td>
</tr>
<tr>
<td>median</td>
<td>644.4</td>
<td>880.25</td>
<td>960.92</td>
<td>1359.63</td>
<td>993.7</td>
</tr>
<tr>
<td>first quartile</td>
<td>308.11</td>
<td>792.44</td>
<td>822.27</td>
<td>1359.63</td>
<td>960.92</td>
</tr>
<tr>
<td>third quartile</td>
<td>907.68</td>
<td>975.22</td>
<td>1203.57</td>
<td>1388.43</td>
<td>1325.26</td>
</tr>
<tr>
<td>minimum</td>
<td>276.58</td>
<td>762.48</td>
<td>822.27</td>
<td>1024.78</td>
<td>960.92</td>
</tr>
<tr>
<td>maximum</td>
<td>978.86</td>
<td>1041.06</td>
<td>1226.08</td>
<td>1426.2</td>
<td>1388.43</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>64</td><td>657.32</td><td>802.14</td><td>907.68</td><td>1075.22</td><td>993.7</td></tr>
<tr><td>64</td><td>241.21</td><td>1203.57</td><td>947.03</td><td>1525.82</td><td>1009.0</td></tr>
<tr><td>64</td><td>276.58</td><td>1226.08</td><td>1075.22</td><td>1079.64</td><td>975.22</td></tr>
<tr><td>64</td><td>1057.86</td><td>799.69</td><td>920.43</td><td>1116.43</td><td>975.22</td></tr>
<tr><td>64</td><td>269.2</td><td>832.72</td><td>917.21</td><td>1075.22</td><td>1482.67</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>500.43</td>
<td>972.84</td>
<td>953.51</td>
<td>1174.46</td>
<td>1087.16</td>
</tr>
<tr>
<td>standard dev.</td>
<td>355.71</td>
<td>221.43</td>
<td>69.58</td>
<td>197.17</td>
<td>221.55</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>161.3</td>
<td>761.73</td>
<td>887.18</td>
<td>986.48</td>
<td>875.94</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>839.56</td>
<td>1183.95</td>
<td>1019.85</td>
<td>1362.45</td>
<td>1298.38</td>
</tr>
<tr>
<td>geom. mean</td>
<td>416.19</td>
<td>953.53</td>
<td>951.59</td>
<td>1162.84</td>
<td>1071.71</td>
</tr>
<tr>
<td>median</td>
<td>276.58</td>
<td>832.72</td>
<td>920.43</td>
<td>1079.64</td>
<td>993.7</td>
</tr>
<tr>
<td>first quartile</td>
<td>269.2</td>
<td>802.14</td>
<td>917.21</td>
<td>1075.22</td>
<td>975.22</td>
</tr>
<tr>
<td>third quartile</td>
<td>657.32</td>
<td>1203.57</td>
<td>947.03</td>
<td>1116.43</td>
<td>1009.0</td>
</tr>
<tr>
<td>minimum</td>
<td>241.21</td>
<td>799.69</td>
<td>907.68</td>
<td>1075.22</td>
<td>975.22</td>
</tr>
<tr>
<td>maximum</td>
<td>1057.86</td>
<td>1226.08</td>
<td>1075.22</td>
<td>1525.82</td>
<td>1482.67</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>-19.69 % </td>
<td>9.27 % </td>
<td>-5.31 % </td>
<td>-10.46 % </td>
<td>-3.44 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.5857</td>
<td>0.4831</td>
<td>0.5845</td>
<td>0.2642</td>
<td>0.7852</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
</tr>
</table>
<a name="128"></a> 
<img src="128.png" alt="128" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="6">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>128</td><td>1024.39</td><td>1301.59</td><td>1358.94</td><td>536.19</td><td>1665.43</td><td>1542.9</td></tr>
<tr><td>128</td><td>743.88</td><td>816.89</td><td>912.11</td><td>1051.09</td><td>1225.53</td><td>1088.17</td></tr>
<tr><td>128</td><td>1085.92</td><td>499.89</td><td>1106.55</td><td>1317.95</td><td>570.62</td><td>1469.39</td></tr>
<tr><td>128</td><td>939.91</td><td>850.0</td><td>933.22</td><td>1024.39</td><td>1157.87</td><td>1068.22</td></tr>
<tr><td>128</td><td>394.26</td><td>832.46</td><td>939.91</td><td>1032.46</td><td>536.74</td><td>1016.44</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>837.67</td>
<td>860.17</td>
<td>1050.15</td>
<td>992.41</td>
<td>1031.24</td>
<td>1237.03</td>
</tr>
<tr>
<td>standard dev.</td>
<td>279.44</td>
<td>286.09</td>
<td>189.35</td>
<td>282.92</td>
<td>477.67</td>
<td>248.43</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>571.25</td>
<td>587.41</td>
<td>869.62</td>
<td>722.68</td>
<td>575.83</td>
<td>1000.18</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1104.09</td>
<td>1132.93</td>
<td>1230.67</td>
<td>1262.15</td>
<td>1486.65</td>
<td>1473.88</td>
</tr>
<tr>
<td>geom. mean</td>
<td>789.45</td>
<td>822.36</td>
<td>1037.67</td>
<td>952.88</td>
<td>937.4</td>
<td>1217.82</td>
</tr>
<tr>
<td>median</td>
<td>939.91</td>
<td>832.46</td>
<td>939.91</td>
<td>1032.46</td>
<td>1157.87</td>
<td>1088.17</td>
</tr>
<tr>
<td>first quartile</td>
<td>743.88</td>
<td>816.89</td>
<td>933.22</td>
<td>1024.39</td>
<td>570.62</td>
<td>1068.22</td>
</tr>
<tr>
<td>third quartile</td>
<td>1024.39</td>
<td>850.0</td>
<td>1106.55</td>
<td>1051.09</td>
<td>1225.53</td>
<td>1469.39</td>
</tr>
<tr>
<td>minimum</td>
<td>394.26</td>
<td>499.89</td>
<td>912.11</td>
<td>536.19</td>
<td>536.74</td>
<td>1016.44</td>
</tr>
<tr>
<td>maximum</td>
<td>1085.92</td>
<td>1301.59</td>
<td>1358.94</td>
<td>1317.95</td>
<td>1665.43</td>
<td>1542.9</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>128</td><td>1106.55</td><td>780.42</td><td>529.69</td><td>1048.98</td><td>1686.87</td><td>1059.58</td></tr>
<tr><td>128</td><td>1085.92</td><td>444.76</td><td>962.34</td><td>1042.72</td><td>1214.17</td><td>439.91</td></tr>
<tr><td>128</td><td>578.81</td><td>832.46</td><td>743.88</td><td>584.62</td><td>1214.17</td><td>850.0</td></tr>
<tr><td>128</td><td>435.53</td><td>828.51</td><td>933.22</td><td>828.51</td><td>1714.45</td><td>833.78</td></tr>
<tr><td>128</td><td>360.14</td><td>679.3</td><td>933.22</td><td>1032.46</td><td>1225.53</td><td>839.12</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>713.39</td>
<td>713.09</td>
<td>820.47</td>
<td>907.46</td>
<td>1411.04</td>
<td>804.48</td>
</tr>
<tr>
<td>standard dev.</td>
<td>358.28</td>
<td>162.21</td>
<td>184.37</td>
<td>202.74</td>
<td>264.6</td>
<td>224.79</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>371.81</td>
<td>558.44</td>
<td>644.69</td>
<td>714.17</td>
<td>1158.77</td>
<td>590.17</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1054.97</td>
<td>867.74</td>
<td>996.25</td>
<td>1100.75</td>
<td>1663.31</td>
<td>1018.79</td>
</tr>
<tr>
<td>geom. mean</td>
<td>642.03</td>
<td>695.4</td>
<td>801.24</td>
<td>886.33</td>
<td>1391.93</td>
<td>773.68</td>
</tr>
<tr>
<td>median</td>
<td>578.81</td>
<td>780.42</td>
<td>933.22</td>
<td>1032.46</td>
<td>1225.53</td>
<td>839.12</td>
</tr>
<tr>
<td>first quartile</td>
<td>435.53</td>
<td>679.3</td>
<td>743.88</td>
<td>828.51</td>
<td>1214.17</td>
<td>833.78</td>
</tr>
<tr>
<td>third quartile</td>
<td>1085.92</td>
<td>828.51</td>
<td>933.22</td>
<td>1042.72</td>
<td>1686.87</td>
<td>850.0</td>
</tr>
<tr>
<td>minimum</td>
<td>360.14</td>
<td>444.76</td>
<td>529.69</td>
<td>584.62</td>
<td>1214.17</td>
<td>439.91</td>
</tr>
<tr>
<td>maximum</td>
<td>1106.55</td>
<td>832.46</td>
<td>962.34</td>
<td>1048.98</td>
<td>1714.45</td>
<td>1059.58</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>-14.84 % </td>
<td>-17.1 % </td>
<td>-21.87 % </td>
<td>-8.56 % </td>
<td>36.83 % </td>
<td>-34.97 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.5578</td>
<td>0.3466</td>
<td>0.0879</td>
<td>0.6001</td>
<td>0.1585</td>
<td>0.0203</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>DIFF</td>
<td>SAME</td>
<td>SAME</td>
<td>DIFF</td>
</tr>
</table>
<a name="256"></a> 
<img src="256.png" alt="256" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="7">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>256</td><td>1073.47</td><td>1213.9</td><td>771.69</td><td>1351.6</td><td>1623.67</td><td>1811.62</td><td>1664.92</td></tr>
<tr><td>256</td><td>726.76</td><td>588.16</td><td>1419.29</td><td>1049.83</td><td>1551.59</td><td>1294.85</td><td>682.75</td></tr>
<tr><td>256</td><td>1137.52</td><td>1336.1</td><td>654.21</td><td>1037.37</td><td>1444.71</td><td>1748.19</td><td>1582.03</td></tr>
<tr><td>256</td><td>735.43</td><td>1007.46</td><td>965.71</td><td>995.98</td><td>1563.16</td><td>1282.18</td><td>1121.7</td></tr>
<tr><td>256</td><td>505.14</td><td>838.99</td><td>1396.6</td><td>1041.49</td><td>702.42</td><td>1329.32</td><td>684.98</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>835.67</td>
<td>996.92</td>
<td>1041.5</td>
<td>1095.25</td>
<td>1377.11</td>
<td>1493.23</td>
<td>1147.28</td>
</tr>
<tr>
<td>standard dev.</td>
<td>264.02</td>
<td>297.6</td>
<td>352.62</td>
<td>144.8</td>
<td>382.63</td>
<td>263.22</td>
<td>470.93</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>583.95</td>
<td>713.2</td>
<td>705.32</td>
<td>957.2</td>
<td>1012.31</td>
<td>1242.28</td>
<td>698.29</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1087.38</td>
<td>1280.65</td>
<td>1377.68</td>
<td>1233.31</td>
<td>1741.91</td>
<td>1744.18</td>
<td>1596.26</td>
</tr>
<tr>
<td>geom. mean</td>
<td>800.98</td>
<td>957.86</td>
<td>993.18</td>
<td>1088.33</td>
<td>1319.26</td>
<td>1475.34</td>
<td>1066.81</td>
</tr>
<tr>
<td>median</td>
<td>735.43</td>
<td>1007.46</td>
<td>965.71</td>
<td>1041.49</td>
<td>1551.59</td>
<td>1329.32</td>
<td>1121.7</td>
</tr>
<tr>
<td>first quartile</td>
<td>726.76</td>
<td>838.99</td>
<td>771.69</td>
<td>1037.37</td>
<td>1444.71</td>
<td>1294.85</td>
<td>684.98</td>
</tr>
<tr>
<td>third quartile</td>
<td>1073.47</td>
<td>1213.9</td>
<td>1396.6</td>
<td>1049.83</td>
<td>1563.16</td>
<td>1748.19</td>
<td>1582.03</td>
</tr>
<tr>
<td>minimum</td>
<td>505.14</td>
<td>588.16</td>
<td>654.21</td>
<td>995.98</td>
<td>702.42</td>
<td>1282.18</td>
<td>682.75</td>
</tr>
<tr>
<td>maximum</td>
<td>1137.52</td>
<td>1336.1</td>
<td>1419.29</td>
<td>1351.6</td>
<td>1623.67</td>
<td>1811.62</td>
<td>1664.92</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>256</td><td>1136.29</td><td>603.74</td><td>534.22</td><td>1095.91</td><td>1479.36</td><td>1771.82</td><td>814.23</td></tr>
<tr><td>256</td><td>750.7</td><td>850.56</td><td>1428.96</td><td>969.28</td><td>1623.67</td><td>677.9</td><td>1678.24</td></tr>
<tr><td>256</td><td>606.88</td><td>886.52</td><td>622.0</td><td>739.58</td><td>1041.49</td><td>1762.89</td><td>1269.76</td></tr>
<tr><td>256</td><td>779.14</td><td>850.56</td><td>926.46</td><td>999.78</td><td>778.56</td><td>1183.75</td><td>679.21</td></tr>
<tr><td>256</td><td>769.42</td><td>880.56</td><td>722.75</td><td>984.76</td><td>1037.37</td><td>1195.9</td><td>1421.21</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>808.49</td>
<td>814.39</td>
<td>846.88</td>
<td>957.86</td>
<td>1192.09</td>
<td>1318.45</td>
<td>1172.53</td>
</tr>
<tr>
<td>standard dev.</td>
<td>196.1</td>
<td>118.92</td>
<td>356.68</td>
<td>131.64</td>
<td>348.71</td>
<td>460.04</td>
<td>417.96</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>621.52</td>
<td>701.01</td>
<td>506.83</td>
<td>832.36</td>
<td>859.63</td>
<td>879.86</td>
<td>774.05</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>995.45</td>
<td>927.77</td>
<td>1186.93</td>
<td>1083.37</td>
<td>1524.55</td>
<td>1757.05</td>
<td>1571.02</td>
</tr>
<tr>
<td>geom. mean</td>
<td>791.35</td>
<td>806.38</td>
<td>795.19</td>
<td>949.92</td>
<td>1151.04</td>
<td>1245.53</td>
<td>1108.66</td>
</tr>
<tr>
<td>median</td>
<td>769.42</td>
<td>850.56</td>
<td>722.75</td>
<td>984.76</td>
<td>1041.49</td>
<td>1195.9</td>
<td>1269.76</td>
</tr>
<tr>
<td>first quartile</td>
<td>750.7</td>
<td>850.56</td>
<td>622.0</td>
<td>969.28</td>
<td>1037.37</td>
<td>1183.75</td>
<td>814.23</td>
</tr>
<tr>
<td>third quartile</td>
<td>779.14</td>
<td>880.56</td>
<td>926.46</td>
<td>999.78</td>
<td>1479.36</td>
<td>1762.89</td>
<td>1421.21</td>
</tr>
<tr>
<td>minimum</td>
<td>606.88</td>
<td>603.74</td>
<td>534.22</td>
<td>739.58</td>
<td>778.56</td>
<td>677.9</td>
<td>679.21</td>
</tr>
<tr>
<td>maximum</td>
<td>1136.29</td>
<td>886.52</td>
<td>1428.96</td>
<td>1095.91</td>
<td>1623.67</td>
<td>1771.82</td>
<td>1678.24</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>-3.25 % </td>
<td>-18.31 % </td>
<td>-18.69 % </td>
<td>-12.54 % </td>
<td>-13.44 % </td>
<td>-11.7 % </td>
<td>2.2 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.858</td>
<td>0.2386</td>
<td>0.4108</td>
<td>0.1551</td>
<td>0.4473</td>
<td>0.482</td>
<td>0.9307</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
</tr>
</table>
<a name="512"></a> 
<img src="512.png" alt="512" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="8">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>512</td><td>1178.97</td><td>1408.61</td><td>1470.85</td><td>1537.72</td><td>1592.61</td><td>1677.98</td><td>1872.78</td><td>1717.84</td></tr>
<tr><td>512</td><td>650.32</td><td>728.73</td><td>761.27</td><td>1184.96</td><td>1123.39</td><td>880.12</td><td>1024.6</td><td>1275.01</td></tr>
<tr><td>512</td><td>1146.73</td><td>847.4</td><td>1330.0</td><td>925.97</td><td>939.67</td><td>1623.43</td><td>1151.77</td><td>1655.46</td></tr>
<tr><td>512</td><td>791.14</td><td>1113.84</td><td>801.11</td><td>996.36</td><td>1039.84</td><td>1208.17</td><td>1014.19</td><td>1213.77</td></tr>
<tr><td>512</td><td>696.54</td><td>711.43</td><td>1128.22</td><td>1216.58</td><td>846.03</td><td>1171.07</td><td>1457.56</td><td>946.88</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>892.74</td>
<td>962.0</td>
<td>1098.29</td>
<td>1172.32</td>
<td>1108.31</td>
<td>1312.15</td>
<td>1304.18</td>
<td>1361.79</td>
</tr>
<tr>
<td>standard dev.</td>
<td>252.0</td>
<td>297.01</td>
<td>314.36</td>
<td>238.37</td>
<td>290.12</td>
<td>334.7</td>
<td>364.8</td>
<td>321.95</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>652.48</td>
<td>678.84</td>
<td>798.58</td>
<td>945.06</td>
<td>831.7</td>
<td>993.05</td>
<td>956.38</td>
<td>1054.85</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1133.0</td>
<td>1245.17</td>
<td>1398.0</td>
<td>1399.58</td>
<td>1384.91</td>
<td>1631.25</td>
<td>1651.98</td>
<td>1668.74</td>
</tr>
<tr>
<td>geom. mean</td>
<td>865.08</td>
<td>928.28</td>
<td>1061.23</td>
<td>1153.85</td>
<td>1081.42</td>
<td>1276.72</td>
<td>1267.16</td>
<td>1330.36</td>
</tr>
<tr>
<td>median</td>
<td>791.14</td>
<td>847.4</td>
<td>1128.22</td>
<td>1184.96</td>
<td>1039.84</td>
<td>1208.17</td>
<td>1151.77</td>
<td>1275.01</td>
</tr>
<tr>
<td>first quartile</td>
<td>696.54</td>
<td>728.73</td>
<td>801.11</td>
<td>996.36</td>
<td>939.67</td>
<td>1171.07</td>
<td>1024.6</td>
<td>1213.77</td>
</tr>
<tr>
<td>third quartile</td>
<td>1146.73</td>
<td>1113.84</td>
<td>1330.0</td>
<td>1216.58</td>
<td>1123.39</td>
<td>1623.43</td>
<td>1457.56</td>
<td>1655.46</td>
</tr>
<tr>
<td>minimum</td>
<td>650.32</td>
<td>711.43</td>
<td>761.27</td>
<td>925.97</td>
<td>846.03</td>
<td>880.12</td>
<td>1014.19</td>
<td>946.88</td>
</tr>
<tr>
<td>maximum</td>
<td>1178.97</td>
<td>1408.61</td>
<td>1470.85</td>
<td>1537.72</td>
<td>1592.61</td>
<td>1677.98</td>
<td>1872.78</td>
<td>1717.84</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>512</td><td>863.8</td><td>887.94</td><td>1278.9</td><td>970.54</td><td>1046.06</td><td>1046.06</td><td>1199.19</td><td>1101.56</td></tr>
<tr><td>512</td><td>907.54</td><td>929.26</td><td>856.05</td><td>889.45</td><td>1234.49</td><td>1302.74</td><td>1091.81</td><td>1534.34</td></tr>
<tr><td>512</td><td>740.83</td><td>1231.59</td><td>1125.8</td><td>1173.69</td><td>1225.83</td><td>1660.71</td><td>1103.88</td><td>1084.47</td></tr>
<tr><td>512</td><td>912.68</td><td>516.56</td><td>1305.17</td><td>887.94</td><td>1252.92</td><td>1645.08</td><td>1561.77</td><td>1671.3</td></tr>
<tr><td>512</td><td>731.02</td><td>818.62</td><td>1444.51</td><td>899.37</td><td>972.79</td><td>1326.63</td><td>1866.12</td><td>1650.25</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>831.17</td>
<td>876.79</td>
<td>1202.09</td>
<td>964.2</td>
<td>1146.42</td>
<td>1396.24</td>
<td>1364.55</td>
<td>1408.38</td>
</tr>
<tr>
<td>standard dev.</td>
<td>89.07</td>
<td>255.88</td>
<td>224.09</td>
<td>121.99</td>
<td>128.08</td>
<td>258.88</td>
<td>339.17</td>
<td>292.64</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>746.26</td>
<td>632.84</td>
<td>988.44</td>
<td>847.89</td>
<td>1024.3</td>
<td>1149.43</td>
<td>1041.19</td>
<td>1129.38</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>916.09</td>
<td>1120.75</td>
<td>1415.73</td>
<td>1080.51</td>
<td>1268.53</td>
<td>1643.06</td>
<td>1687.91</td>
<td>1687.38</td>
</tr>
<tr>
<td>geom. mean</td>
<td>827.27</td>
<td>844.58</td>
<td>1183.69</td>
<td>958.52</td>
<td>1140.47</td>
<td>1376.35</td>
<td>1333.22</td>
<td>1382.77</td>
</tr>
<tr>
<td>median</td>
<td>863.8</td>
<td>887.94</td>
<td>1278.9</td>
<td>899.37</td>
<td>1225.83</td>
<td>1326.63</td>
<td>1199.19</td>
<td>1534.34</td>
</tr>
<tr>
<td>first quartile</td>
<td>740.83</td>
<td>818.62</td>
<td>1125.8</td>
<td>889.45</td>
<td>1046.06</td>
<td>1302.74</td>
<td>1103.88</td>
<td>1101.56</td>
</tr>
<tr>
<td>third quartile</td>
<td>907.54</td>
<td>929.26</td>
<td>1305.17</td>
<td>970.54</td>
<td>1234.49</td>
<td>1645.08</td>
<td>1561.77</td>
<td>1650.25</td>
</tr>
<tr>
<td>minimum</td>
<td>731.02</td>
<td>516.56</td>
<td>856.05</td>
<td>887.94</td>
<td>972.79</td>
<td>1046.06</td>
<td>1091.81</td>
<td>1084.47</td>
</tr>
<tr>
<td>maximum</td>
<td>912.68</td>
<td>1231.59</td>
<td>1444.51</td>
<td>1173.69</td>
<td>1252.92</td>
<td>1660.71</td>
<td>1866.12</td>
<td>1671.3</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>-6.9 % </td>
<td>-8.86 % </td>
<td>9.45 % </td>
<td>-17.75 % </td>
<td>3.44 % </td>
<td>6.41 % </td>
<td>4.63 % </td>
<td>3.42 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.6204</td>
<td>0.64</td>
<td>0.5644</td>
<td>0.1204</td>
<td>0.795</td>
<td>0.6685</td>
<td>0.7932</td>
<td>0.8168</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
</tr>
</table>
<a name="1024"></a> 
<img src="1024.png" alt="1024" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>1024</td><td>1018.33</td><td>1141.68</td><td>1199.12</td><td>1267.62</td><td>1275.33</td><td>1303.47</td><td>1382.98</td><td>1815.08</td><td>1369.88</td></tr>
<tr><td>1024</td><td>784.3</td><td>936.27</td><td>963.36</td><td>1015.13</td><td>1013.16</td><td>1049.15</td><td>1179.23</td><td>1113.79</td><td>1337.13</td></tr>
<tr><td>1024</td><td>962.48</td><td>1104.98</td><td>1145.42</td><td>1198.78</td><td>1428.67</td><td>1248.38</td><td>1321.12</td><td>1712.1</td><td>1310.39</td></tr>
<tr><td>1024</td><td>688.74</td><td>1040.56</td><td>1161.6</td><td>953.08</td><td>1048.1</td><td>1091.75</td><td>937.11</td><td>1298.62</td><td>1136.11</td></tr>
<tr><td>1024</td><td>731.63</td><td>796.82</td><td>831.25</td><td>1012.19</td><td>956.12</td><td>1096.61</td><td>1200.5</td><td>1483.76</td><td>1075.24</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>837.1</td>
<td>1004.06</td>
<td>1060.15</td>
<td>1089.36</td>
<td>1144.28</td>
<td>1157.87</td>
<td>1204.19</td>
<td>1484.67</td>
<td>1245.75</td>
</tr>
<tr>
<td>standard dev.</td>
<td>145.33</td>
<td>139.64</td>
<td>157.04</td>
<td>135.82</td>
<td>199.94</td>
<td>111.06</td>
<td>171.47</td>
<td>288.56</td>
<td>131.37</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>698.54</td>
<td>870.93</td>
<td>910.43</td>
<td>959.87</td>
<td>953.66</td>
<td>1051.99</td>
<td>1040.71</td>
<td>1209.56</td>
<td>1120.5</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>975.66</td>
<td>1137.2</td>
<td>1209.87</td>
<td>1218.85</td>
<td>1334.89</td>
<td>1263.75</td>
<td>1367.67</td>
<td>1759.78</td>
<td>1370.99</td>
</tr>
<tr>
<td>geom. mean</td>
<td>827.22</td>
<td>995.83</td>
<td>1050.22</td>
<td>1082.75</td>
<td>1130.91</td>
<td>1153.7</td>
<td>1193.72</td>
<td>1461.55</td>
<td>1240.04</td>
</tr>
<tr>
<td>median</td>
<td>784.3</td>
<td>1040.56</td>
<td>1145.42</td>
<td>1015.13</td>
<td>1048.1</td>
<td>1096.61</td>
<td>1200.5</td>
<td>1483.76</td>
<td>1310.39</td>
</tr>
<tr>
<td>first quartile</td>
<td>731.63</td>
<td>936.27</td>
<td>963.36</td>
<td>1012.19</td>
<td>1013.16</td>
<td>1091.75</td>
<td>1179.23</td>
<td>1298.62</td>
<td>1136.11</td>
</tr>
<tr>
<td>third quartile</td>
<td>962.48</td>
<td>1104.98</td>
<td>1161.6</td>
<td>1198.78</td>
<td>1275.33</td>
<td>1248.38</td>
<td>1321.12</td>
<td>1712.1</td>
<td>1337.13</td>
</tr>
<tr>
<td>minimum</td>
<td>688.74</td>
<td>796.82</td>
<td>831.25</td>
<td>953.08</td>
<td>956.12</td>
<td>1049.15</td>
<td>937.11</td>
<td>1113.79</td>
<td>1075.24</td>
</tr>
<tr>
<td>maximum</td>
<td>1018.33</td>
<td>1141.68</td>
<td>1199.12</td>
<td>1267.62</td>
<td>1428.67</td>
<td>1303.47</td>
<td>1382.98</td>
<td>1815.08</td>
<td>1369.88</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>1024</td><td>947.91</td><td>1016.11</td><td>1037.22</td><td>1088.07</td><td>1127.56</td><td>1312.44</td><td>1349.6</td><td>1466.13</td><td>1416.61</td></tr>
<tr><td>1024</td><td>855.49</td><td>1082.18</td><td>904.96</td><td>1068.39</td><td>1089.2</td><td>1135.19</td><td>1228.27</td><td>1193.32</td><td>1335.0</td></tr>
<tr><td>1024</td><td>689.19</td><td>1015.13</td><td>1046.01</td><td>1083.57</td><td>1079.95</td><td>1246.89</td><td>1223.97</td><td>1356.59</td><td>1592.49</td></tr>
<tr><td>1024</td><td>821.16</td><td>1142.92</td><td>1064.06</td><td>1180.89</td><td>1102.37</td><td>1138.89</td><td>1455.44</td><td>1388.93</td><td>1633.42</td></tr>
<tr><td>1024</td><td>678.38</td><td>984.39</td><td>1119.73</td><td>1069.48</td><td>1309.16</td><td>1331.61</td><td>1535.92</td><td>1398.66</td><td>1331.18</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>798.43</td>
<td>1048.14</td>
<td>1034.39</td>
<td>1098.08</td>
<td>1141.65</td>
<td>1233.0</td>
<td>1358.64</td>
<td>1360.73</td>
<td>1461.74</td>
</tr>
<tr>
<td>standard dev.</td>
<td>114.52</td>
<td>63.88</td>
<td>79.15</td>
<td>47.08</td>
<td>95.34</td>
<td>93.07</td>
<td>137.85</td>
<td>101.72</td>
<td>142.93</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>689.24</td>
<td>987.24</td>
<td>958.93</td>
<td>1053.19</td>
<td>1050.75</td>
<td>1144.27</td>
<td>1227.21</td>
<td>1263.75</td>
<td>1325.47</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>907.61</td>
<td>1109.05</td>
<td>1109.86</td>
<td>1142.97</td>
<td>1232.55</td>
<td>1321.74</td>
<td>1490.07</td>
<td>1457.7</td>
<td>1598.01</td>
</tr>
<tr>
<td>geom. mean</td>
<td>791.85</td>
<td>1046.62</td>
<td>1031.86</td>
<td>1097.3</td>
<td>1138.66</td>
<td>1230.17</td>
<td>1353.09</td>
<td>1357.54</td>
<td>1456.22</td>
</tr>
<tr>
<td>median</td>
<td>821.16</td>
<td>1016.11</td>
<td>1046.01</td>
<td>1083.57</td>
<td>1102.37</td>
<td>1246.89</td>
<td>1349.6</td>
<td>1388.93</td>
<td>1416.61</td>
</tr>
<tr>
<td>first quartile</td>
<td>689.19</td>
<td>1015.13</td>
<td>1037.22</td>
<td>1069.48</td>
<td>1089.2</td>
<td>1138.89</td>
<td>1228.27</td>
<td>1356.59</td>
<td>1335.0</td>
</tr>
<tr>
<td>third quartile</td>
<td>855.49</td>
<td>1082.18</td>
<td>1064.06</td>
<td>1088.07</td>
<td>1127.56</td>
<td>1312.44</td>
<td>1455.44</td>
<td>1398.66</td>
<td>1592.49</td>
</tr>
<tr>
<td>minimum</td>
<td>678.38</td>
<td>984.39</td>
<td>904.96</td>
<td>1068.39</td>
<td>1079.95</td>
<td>1135.19</td>
<td>1223.97</td>
<td>1193.32</td>
<td>1331.18</td>
</tr>
<tr>
<td>maximum</td>
<td>947.91</td>
<td>1142.92</td>
<td>1119.73</td>
<td>1180.89</td>
<td>1309.16</td>
<td>1331.61</td>
<td>1535.92</td>
<td>1466.13</td>
<td>1633.42</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>-4.62 % </td>
<td>4.39 % </td>
<td>-2.43 % </td>
<td>0.8 % </td>
<td>-0.23 % </td>
<td>6.49 % </td>
<td>12.83 % </td>
<td>-8.35 % </td>
<td>17.34 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.6527</td>
<td>0.5389</td>
<td>0.7517</td>
<td>0.8954</td>
<td>0.9795</td>
<td>0.2797</td>
<td>0.1551</td>
<td>0.3915</td>
<td>0.0376</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>DIFF</td>
</tr>
</table>
<a name="2048"></a> 
<img src="2048.png" alt="2048" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="10">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>2048</td><td>1010.58</td><td>1268.16</td><td>1189.74</td><td>1232.93</td><td>1387.74</td><td>1405.41</td><td>1306.27</td><td>1433.75</td><td>1595.15</td><td>1517.25</td></tr>
<tr><td>2048</td><td>854.69</td><td>956.86</td><td>1063.36</td><td>1031.96</td><td>1052.15</td><td>1029.3</td><td>1103.79</td><td>1183.53</td><td>1236.93</td><td>1410.37</td></tr>
<tr><td>2048</td><td>828.52</td><td>1113.61</td><td>1130.57</td><td>1256.19</td><td>1182.03</td><td>1226.98</td><td>1242.24</td><td>1263.38</td><td>1409.42</td><td>1472.77</td></tr>
<tr><td>2048</td><td>836.45</td><td>948.74</td><td>990.53</td><td>1021.41</td><td>1024.15</td><td>1028.8</td><td>1100.03</td><td>1101.91</td><td>1391.65</td><td>1384.07</td></tr>
<tr><td>2048</td><td>785.54</td><td>939.81</td><td>947.46</td><td>999.5</td><td>1032.09</td><td>1127.38</td><td>1276.26</td><td>1286.83</td><td>1306.27</td><td>1207.72</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>863.15</td>
<td>1045.44</td>
<td>1064.33</td>
<td>1108.4</td>
<td>1135.63</td>
<td>1163.57</td>
<td>1205.72</td>
<td>1253.88</td>
<td>1387.88</td>
<td>1398.44</td>
</tr>
<tr>
<td>standard dev.</td>
<td>86.23</td>
<td>143.7</td>
<td>99.02</td>
<td>125.12</td>
<td>154.78</td>
<td>158.12</td>
<td>97.44</td>
<td>124.07</td>
<td>134.99</td>
<td>118.71</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>780.94</td>
<td>908.43</td>
<td>969.92</td>
<td>989.11</td>
<td>988.06</td>
<td>1012.82</td>
<td>1112.82</td>
<td>1135.59</td>
<td>1259.19</td>
<td>1285.27</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>945.37</td>
<td>1182.44</td>
<td>1158.74</td>
<td>1227.69</td>
<td>1283.2</td>
<td>1314.32</td>
<td>1298.62</td>
<td>1372.17</td>
<td>1516.58</td>
<td>1511.61</td>
</tr>
<tr>
<td>geom. mean</td>
<td>859.92</td>
<td>1037.98</td>
<td>1060.65</td>
<td>1102.88</td>
<td>1127.76</td>
<td>1155.36</td>
<td>1202.52</td>
<td>1249.02</td>
<td>1382.77</td>
<td>1394.22</td>
</tr>
<tr>
<td>median</td>
<td>836.45</td>
<td>956.86</td>
<td>1063.36</td>
<td>1031.96</td>
<td>1052.15</td>
<td>1127.38</td>
<td>1242.24</td>
<td>1263.38</td>
<td>1391.65</td>
<td>1410.37</td>
</tr>
<tr>
<td>first quartile</td>
<td>828.52</td>
<td>948.74</td>
<td>990.53</td>
<td>1021.41</td>
<td>1032.09</td>
<td>1029.3</td>
<td>1103.79</td>
<td>1183.53</td>
<td>1306.27</td>
<td>1384.07</td>
</tr>
<tr>
<td>third quartile</td>
<td>854.69</td>
<td>1113.61</td>
<td>1130.57</td>
<td>1232.93</td>
<td>1182.03</td>
<td>1226.98</td>
<td>1276.26</td>
<td>1286.83</td>
<td>1409.42</td>
<td>1472.77</td>
</tr>
<tr>
<td>minimum</td>
<td>785.54</td>
<td>939.81</td>
<td>947.46</td>
<td>999.5</td>
<td>1024.15</td>
<td>1028.8</td>
<td>1100.03</td>
<td>1101.91</td>
<td>1236.93</td>
<td>1207.72</td>
</tr>
<tr>
<td>maximum</td>
<td>1010.58</td>
<td>1268.16</td>
<td>1189.74</td>
<td>1256.19</td>
<td>1387.74</td>
<td>1405.41</td>
<td>1306.27</td>
<td>1433.75</td>
<td>1595.15</td>
<td>1517.25</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>2048</td><td>890.53</td><td>1111.69</td><td>1212.96</td><td>1240.77</td><td>1388.89</td><td>1406.35</td><td>1431.79</td><td>1432.53</td><td>1606.46</td><td>1365.15</td></tr>
<tr><td>2048</td><td>852.52</td><td>1046.51</td><td>1106.85</td><td>1137.62</td><td>1177.21</td><td>1327.14</td><td>1254.69</td><td>1264.33</td><td>1535.02</td><td>1510.42</td></tr>
<tr><td>2048</td><td>924.28</td><td>1172.28</td><td>1188.39</td><td>1013.26</td><td>1142.27</td><td>1205.47</td><td>1243.71</td><td>1258.64</td><td>1403.53</td><td>1545.49</td></tr>
<tr><td>2048</td><td>905.82</td><td>1100.03</td><td>1026.66</td><td>1133.17</td><td>1261.86</td><td>1255.44</td><td>1252.25</td><td>1145.39</td><td>1387.05</td><td>1355.01</td></tr>
<tr><td>2048</td><td>947.89</td><td>1028.8</td><td>1148.84</td><td>1128.59</td><td>1250.01</td><td>1179.2</td><td>1275.48</td><td>1389.81</td><td>1395.82</td><td>1265.86</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>904.21</td>
<td>1091.86</td>
<td>1136.74</td>
<td>1130.68</td>
<td>1244.05</td>
<td>1274.72</td>
<td>1291.59</td>
<td>1298.14</td>
<td>1465.58</td>
<td>1408.39</td>
</tr>
<tr>
<td>standard dev.</td>
<td>35.96</td>
<td>56.92</td>
<td>73.55</td>
<td>80.57</td>
<td>95.07</td>
<td>92.69</td>
<td>79.24</td>
<td>114.56</td>
<td>99.44</td>
<td>116.45</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>869.92</td>
<td>1037.59</td>
<td>1066.62</td>
<td>1053.87</td>
<td>1153.41</td>
<td>1186.35</td>
<td>1216.04</td>
<td>1188.92</td>
<td>1370.77</td>
<td>1297.37</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>938.49</td>
<td>1146.13</td>
<td>1206.86</td>
<td>1207.5</td>
<td>1334.69</td>
<td>1363.09</td>
<td>1367.14</td>
<td>1407.36</td>
<td>1560.38</td>
<td>1519.41</td>
</tr>
<tr>
<td>geom. mean</td>
<td>903.63</td>
<td>1090.68</td>
<td>1134.79</td>
<td>1128.36</td>
<td>1241.2</td>
<td>1272.07</td>
<td>1289.74</td>
<td>1294.06</td>
<td>1462.94</td>
<td>1404.54</td>
</tr>
<tr>
<td>median</td>
<td>905.82</td>
<td>1100.03</td>
<td>1148.84</td>
<td>1133.17</td>
<td>1250.01</td>
<td>1255.44</td>
<td>1254.69</td>
<td>1264.33</td>
<td>1403.53</td>
<td>1365.15</td>
</tr>
<tr>
<td>first quartile</td>
<td>890.53</td>
<td>1046.51</td>
<td>1106.85</td>
<td>1128.59</td>
<td>1177.21</td>
<td>1205.47</td>
<td>1252.25</td>
<td>1258.64</td>
<td>1395.82</td>
<td>1355.01</td>
</tr>
<tr>
<td>third quartile</td>
<td>924.28</td>
<td>1111.69</td>
<td>1188.39</td>
<td>1137.62</td>
<td>1261.86</td>
<td>1327.14</td>
<td>1275.48</td>
<td>1389.81</td>
<td>1535.02</td>
<td>1510.42</td>
</tr>
<tr>
<td>minimum</td>
<td>852.52</td>
<td>1028.8</td>
<td>1026.66</td>
<td>1013.26</td>
<td>1142.27</td>
<td>1179.2</td>
<td>1243.71</td>
<td>1145.39</td>
<td>1387.05</td>
<td>1265.86</td>
</tr>
<tr>
<td>maximum</td>
<td>947.89</td>
<td>1172.28</td>
<td>1212.96</td>
<td>1240.77</td>
<td>1388.89</td>
<td>1406.35</td>
<td>1431.79</td>
<td>1432.53</td>
<td>1606.46</td>
<td>1545.49</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>4.76 % </td>
<td>4.44 % </td>
<td>6.8 % </td>
<td>2.01 % </td>
<td>9.55 % </td>
<td>9.55 % </td>
<td>7.12 % </td>
<td>3.53 % </td>
<td>5.6 % </td>
<td>0.71 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.3546</td>
<td>0.5208</td>
<td>0.2257</td>
<td>0.7463</td>
<td>0.2187</td>
<td>0.2121</td>
<td>0.1648</td>
<td>0.574</td>
<td>0.3304</td>
<td>0.8969</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
</tr>
</table>
<a name="4096"></a> 
<img src="4096.png" alt="4096" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="11">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>4096</td><td>1007.05</td><td>1193.36</td><td>1242.59</td><td>1280.82</td><td>1308.9</td><td>1312.38</td><td>1322.73</td><td>1283.27</td><td>1327.96</td><td>1485.39</td><td>1350.41</td></tr>
<tr><td>4096</td><td>897.86</td><td>1003.97</td><td>1094.7</td><td>1077.89</td><td>1207.79</td><td>1012.7</td><td>1239.56</td><td>1174.4</td><td>1221.78</td><td>1399.17</td><td>1246.47</td></tr>
<tr><td>4096</td><td>937.86</td><td>1117.97</td><td>1134.38</td><td>1229.66</td><td>1190.48</td><td>1232.73</td><td>1265.46</td><td>1248.04</td><td>1261.84</td><td>1446.58</td><td>1305.84</td></tr>
<tr><td>4096</td><td>867.14</td><td>1010.14</td><td>1047.41</td><td>1193.7</td><td>1104.94</td><td>1099.8</td><td>1120.74</td><td>1164.53</td><td>1223.92</td><td>1457.14</td><td>1303.81</td></tr>
<tr><td>4096</td><td>875.28</td><td>991.57</td><td>975.15</td><td>1129.26</td><td>1214.7</td><td>1151.43</td><td>1153.8</td><td>1147.1</td><td>1167.94</td><td>1403.5</td><td>1301.69</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>917.04</td>
<td>1063.4</td>
<td>1098.85</td>
<td>1182.27</td>
<td>1205.36</td>
<td>1161.81</td>
<td>1220.46</td>
<td>1203.47</td>
<td>1240.69</td>
<td>1438.36</td>
<td>1301.64</td>
</tr>
<tr>
<td>standard dev.</td>
<td>57.31</td>
<td>88.59</td>
<td>99.86</td>
<td>80.3</td>
<td>72.66</td>
<td>116.07</td>
<td>82.52</td>
<td>58.94</td>
<td>59.15</td>
<td>36.68</td>
<td>36.89</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>862.4</td>
<td>978.94</td>
<td>1003.64</td>
<td>1105.71</td>
<td>1136.09</td>
<td>1051.15</td>
<td>1141.79</td>
<td>1147.28</td>
<td>1184.29</td>
<td>1403.38</td>
<td>1266.47</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>971.67</td>
<td>1147.87</td>
<td>1194.05</td>
<td>1258.82</td>
<td>1274.64</td>
<td>1272.47</td>
<td>1299.13</td>
<td>1259.66</td>
<td>1297.08</td>
<td>1473.33</td>
<td>1336.82</td>
</tr>
<tr>
<td>geom. mean</td>
<td>915.64</td>
<td>1060.54</td>
<td>1095.25</td>
<td>1180.07</td>
<td>1203.61</td>
<td>1157.15</td>
<td>1218.22</td>
<td>1202.33</td>
<td>1239.57</td>
<td>1437.98</td>
<td>1301.22</td>
</tr>
<tr>
<td>median</td>
<td>897.86</td>
<td>1010.14</td>
<td>1094.7</td>
<td>1193.7</td>
<td>1207.79</td>
<td>1151.43</td>
<td>1239.56</td>
<td>1174.4</td>
<td>1223.92</td>
<td>1446.58</td>
<td>1303.81</td>
</tr>
<tr>
<td>first quartile</td>
<td>875.28</td>
<td>1003.97</td>
<td>1047.41</td>
<td>1129.26</td>
<td>1190.48</td>
<td>1099.8</td>
<td>1153.8</td>
<td>1164.53</td>
<td>1221.78</td>
<td>1403.5</td>
<td>1301.69</td>
</tr>
<tr>
<td>third quartile</td>
<td>937.86</td>
<td>1117.97</td>
<td>1134.38</td>
<td>1229.66</td>
<td>1214.7</td>
<td>1232.73</td>
<td>1265.46</td>
<td>1248.04</td>
<td>1261.84</td>
<td>1457.14</td>
<td>1305.84</td>
</tr>
<tr>
<td>minimum</td>
<td>867.14</td>
<td>991.57</td>
<td>975.15</td>
<td>1077.89</td>
<td>1104.94</td>
<td>1012.7</td>
<td>1120.74</td>
<td>1147.1</td>
<td>1167.94</td>
<td>1399.17</td>
<td>1246.47</td>
</tr>
<tr>
<td>maximum</td>
<td>1007.05</td>
<td>1193.36</td>
<td>1242.59</td>
<td>1280.82</td>
<td>1308.9</td>
<td>1312.38</td>
<td>1322.73</td>
<td>1283.27</td>
<td>1327.96</td>
<td>1485.39</td>
<td>1350.41</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>4096</td><td>966.16</td><td>1174.07</td><td>1232.28</td><td>1296.16</td><td>1300.78</td><td>1233.45</td><td>1325.44</td><td>1284.94</td><td>1324.5</td><td>1502.69</td><td>1419.05</td></tr>
<tr><td>4096</td><td>899.3</td><td>1082.55</td><td>1190.82</td><td>1232.28</td><td>1254.29</td><td>1281.99</td><td>1281.99</td><td>1215.05</td><td>1308.9</td><td>1489.74</td><td>1347.7</td></tr>
<tr><td>4096</td><td>958.76</td><td>1075.27</td><td>1130.86</td><td>1235.27</td><td>1209.19</td><td>868.44</td><td>2196.6</td><td>1956.11</td><td>1306.35</td><td>1473.78</td><td>1336.85</td></tr>
<tr><td>4096</td><td>960.85</td><td>1109.62</td><td>1142.18</td><td>1237.28</td><td>1233.82</td><td>1283.76</td><td>1287.8</td><td>1267.47</td><td>1311.97</td><td>1448.83</td><td>1417.02</td></tr>
<tr><td>4096</td><td>921.02</td><td>1102.25</td><td>1096.78</td><td>1182.68</td><td>1207.36</td><td>1181.76</td><td>1289.88</td><td>1277.89</td><td>1305.54</td><td>1585.93</td><td>1349.97</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>941.22</td>
<td>1108.75</td>
<td>1158.58</td>
<td>1236.73</td>
<td>1241.09</td>
<td>1169.88</td>
<td>1476.34</td>
<td>1400.29</td>
<td>1311.45</td>
<td>1500.19</td>
<td>1374.12</td>
</tr>
<tr>
<td>standard dev.</td>
<td>29.5</td>
<td>39.1</td>
<td>53.22</td>
<td>40.24</td>
<td>38.56</td>
<td>173.63</td>
<td>403.0</td>
<td>311.92</td>
<td>7.72</td>
<td>51.96</td>
<td>40.4</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>913.1</td>
<td>1071.47</td>
<td>1107.85</td>
<td>1198.37</td>
<td>1204.33</td>
<td>1004.35</td>
<td>1092.13</td>
<td>1102.91</td>
<td>1304.1</td>
<td>1450.65</td>
<td>1335.6</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>969.34</td>
<td>1146.03</td>
<td>1209.32</td>
<td>1275.09</td>
<td>1277.85</td>
<td>1335.42</td>
<td>1860.56</td>
<td>1697.68</td>
<td>1318.81</td>
<td>1549.74</td>
<td>1412.64</td>
</tr>
<tr>
<td>geom. mean</td>
<td>940.85</td>
<td>1108.21</td>
<td>1157.61</td>
<td>1236.21</td>
<td>1240.61</td>
<td>1158.12</td>
<td>1440.39</td>
<td>1376.77</td>
<td>1311.43</td>
<td>1499.49</td>
<td>1373.65</td>
</tr>
<tr>
<td>median</td>
<td>958.76</td>
<td>1102.25</td>
<td>1142.18</td>
<td>1235.27</td>
<td>1233.82</td>
<td>1233.45</td>
<td>1289.88</td>
<td>1277.89</td>
<td>1308.9</td>
<td>1489.74</td>
<td>1349.97</td>
</tr>
<tr>
<td>first quartile</td>
<td>921.02</td>
<td>1082.55</td>
<td>1130.86</td>
<td>1232.28</td>
<td>1209.19</td>
<td>1181.76</td>
<td>1287.8</td>
<td>1267.47</td>
<td>1306.35</td>
<td>1473.78</td>
<td>1347.7</td>
</tr>
<tr>
<td>third quartile</td>
<td>960.85</td>
<td>1109.62</td>
<td>1190.82</td>
<td>1237.28</td>
<td>1254.29</td>
<td>1281.99</td>
<td>1325.44</td>
<td>1284.94</td>
<td>1311.97</td>
<td>1502.69</td>
<td>1417.02</td>
</tr>
<tr>
<td>minimum</td>
<td>899.3</td>
<td>1075.27</td>
<td>1096.78</td>
<td>1182.68</td>
<td>1207.36</td>
<td>868.44</td>
<td>1281.99</td>
<td>1215.05</td>
<td>1305.54</td>
<td>1448.83</td>
<td>1336.85</td>
</tr>
<tr>
<td>maximum</td>
<td>966.16</td>
<td>1174.07</td>
<td>1232.28</td>
<td>1296.16</td>
<td>1300.78</td>
<td>1283.76</td>
<td>2196.6</td>
<td>1956.11</td>
<td>1324.5</td>
<td>1585.93</td>
<td>1419.05</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>2.64 % </td>
<td>4.26 % </td>
<td>5.44 % </td>
<td>4.61 % </td>
<td>2.96 % </td>
<td>0.7 % </td>
<td>20.97 % </td>
<td>16.35 % </td>
<td>5.7 % </td>
<td>4.3 % </td>
<td>5.57 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.4258</td>
<td>0.3256</td>
<td>0.2717</td>
<td>0.2121</td>
<td>0.3599</td>
<td>0.9332</td>
<td>0.2017</td>
<td>0.203</td>
<td>0.0291</td>
<td>0.0615</td>
<td>0.0181</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="8192"></a> 
<img src="8192.png" alt="8192" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="12">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>8192</td><td>1025.13</td><td>1151.89</td><td>1211.01</td><td>1278.76</td><td>1291.36</td><td>1292.2</td><td>1288.63</td><td>1246.5</td><td>1228.66</td><td>1239.73</td><td>1436.48</td><td>1247.29</td></tr>
<tr><td>8192</td><td>929.46</td><td>1072.99</td><td>1118.12</td><td>1174.22</td><td>1199.19</td><td>1182.92</td><td>1240.15</td><td>1143.65</td><td>1154.71</td><td>1220.83</td><td>1391.1</td><td>1250.59</td></tr>
<tr><td>8192</td><td>968.86</td><td>1132.19</td><td>1151.89</td><td>1226.77</td><td>1226.05</td><td>1229.6</td><td>1251.34</td><td>1191.74</td><td>1179.42</td><td>1242.4</td><td>1419.94</td><td>1245.12</td></tr>
<tr><td>8192</td><td>904.07</td><td>1019.0</td><td>1081.81</td><td>1132.65</td><td>1146.46</td><td>1147.79</td><td>1199.58</td><td>1145.13</td><td>1160.1</td><td>1235.54</td><td>1381.42</td><td>1226.64</td></tr>
<tr><td>8192</td><td>879.04</td><td>1039.26</td><td>1033.44</td><td>1113.59</td><td>1151.89</td><td>1186.77</td><td>1203.19</td><td>1065.7</td><td>1151.89</td><td>1193.52</td><td>1439.87</td><td>1253.72</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>941.31</td>
<td>1083.07</td>
<td>1119.25</td>
<td>1185.2</td>
<td>1202.99</td>
<td>1207.86</td>
<td>1236.58</td>
<td>1158.55</td>
<td>1174.96</td>
<td>1226.4</td>
<td>1413.76</td>
<td>1244.67</td>
</tr>
<tr>
<td>standard dev.</td>
<td>57.42</td>
<td>57.61</td>
<td>67.55</td>
<td>67.99</td>
<td>59.5</td>
<td>55.37</td>
<td>36.82</td>
<td>66.82</td>
<td>31.89</td>
<td>20.18</td>
<td>26.44</td>
<td>10.6</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>886.57</td>
<td>1028.14</td>
<td>1054.85</td>
<td>1120.37</td>
<td>1146.26</td>
<td>1155.07</td>
<td>1201.47</td>
<td>1094.84</td>
<td>1144.56</td>
<td>1207.16</td>
<td>1388.56</td>
<td>1234.57</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>996.06</td>
<td>1137.99</td>
<td>1183.66</td>
<td>1250.02</td>
<td>1259.72</td>
<td>1260.64</td>
<td>1271.68</td>
<td>1222.25</td>
<td>1205.35</td>
<td>1245.65</td>
<td>1438.97</td>
<td>1254.78</td>
</tr>
<tr>
<td>geom. mean</td>
<td>939.93</td>
<td>1081.84</td>
<td>1117.63</td>
<td>1183.65</td>
<td>1201.83</td>
<td>1206.86</td>
<td>1236.14</td>
<td>1157.0</td>
<td>1174.62</td>
<td>1226.27</td>
<td>1413.56</td>
<td>1244.64</td>
</tr>
<tr>
<td>median</td>
<td>929.46</td>
<td>1072.99</td>
<td>1118.12</td>
<td>1174.22</td>
<td>1199.19</td>
<td>1186.77</td>
<td>1240.15</td>
<td>1145.13</td>
<td>1160.1</td>
<td>1235.54</td>
<td>1419.94</td>
<td>1247.29</td>
</tr>
<tr>
<td>first quartile</td>
<td>904.07</td>
<td>1039.26</td>
<td>1081.81</td>
<td>1132.65</td>
<td>1151.89</td>
<td>1182.92</td>
<td>1203.19</td>
<td>1143.65</td>
<td>1154.71</td>
<td>1220.83</td>
<td>1391.1</td>
<td>1245.12</td>
</tr>
<tr>
<td>third quartile</td>
<td>968.86</td>
<td>1132.19</td>
<td>1151.89</td>
<td>1226.77</td>
<td>1226.05</td>
<td>1229.6</td>
<td>1251.34</td>
<td>1191.74</td>
<td>1179.42</td>
<td>1239.73</td>
<td>1436.48</td>
<td>1250.59</td>
</tr>
<tr>
<td>minimum</td>
<td>879.04</td>
<td>1019.0</td>
<td>1033.44</td>
<td>1113.59</td>
<td>1146.46</td>
<td>1147.79</td>
<td>1199.58</td>
<td>1065.7</td>
<td>1151.89</td>
<td>1193.52</td>
<td>1381.42</td>
<td>1226.64</td>
</tr>
<tr>
<td>maximum</td>
<td>1025.13</td>
<td>1151.89</td>
<td>1211.01</td>
<td>1278.76</td>
<td>1291.36</td>
<td>1292.2</td>
<td>1288.63</td>
<td>1246.5</td>
<td>1228.66</td>
<td>1242.4</td>
<td>1439.87</td>
<td>1253.72</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>8192</td><td>905.19</td><td>1147.29</td><td>1201.21</td><td>1278.57</td><td>1298.91</td><td>1296.4</td><td>1301.68</td><td>1216.94</td><td>1224.94</td><td>1272.07</td><td>1440.12</td><td>1220.44</td></tr>
<tr><td>8192</td><td>935.24</td><td>1097.42</td><td>1157.58</td><td>1260.84</td><td>1263.83</td><td>1231.18</td><td>1253.35</td><td>1232.31</td><td>1198.34</td><td>1233.63</td><td>1420.73</td><td>1264.4</td></tr>
<tr><td>8192</td><td>924.11</td><td>1128.99</td><td>1198.68</td><td>1234.58</td><td>1245.9</td><td>1246.69</td><td>1282.03</td><td>1200.83</td><td>1225.7</td><td>1232.86</td><td>1453.47</td><td>1243.41</td></tr>
<tr><td>8192</td><td>955.21</td><td>1115.44</td><td>1174.39</td><td>1238.36</td><td>1228.48</td><td>1279.59</td><td>1283.7</td><td>1209.92</td><td>1159.78</td><td>1233.45</td><td>1406.96</td><td>1245.72</td></tr>
<tr><td>8192</td><td>920.36</td><td>1124.71</td><td>1174.22</td><td>1237.22</td><td>1236.67</td><td>1269.66</td><td>1276.72</td><td>1211.97</td><td>1212.85</td><td>1270.48</td><td>1457.76</td><td>1235.72</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>928.02</td>
<td>1122.77</td>
<td>1181.22</td>
<td>1249.91</td>
<td>1254.76</td>
<td>1264.7</td>
<td>1279.5</td>
<td>1214.39</td>
<td>1204.32</td>
<td>1248.5</td>
<td>1435.81</td>
<td>1241.94</td>
</tr>
<tr>
<td>standard dev.</td>
<td>18.62</td>
<td>18.3</td>
<td>18.43</td>
<td>19.17</td>
<td>27.96</td>
<td>25.98</td>
<td>17.38</td>
<td>11.59</td>
<td>27.27</td>
<td>20.8</td>
<td>21.63</td>
<td>15.98</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>910.27</td>
<td>1105.32</td>
<td>1163.64</td>
<td>1231.64</td>
<td>1228.1</td>
<td>1239.94</td>
<td>1262.93</td>
<td>1203.34</td>
<td>1178.32</td>
<td>1228.66</td>
<td>1415.18</td>
<td>1226.7</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>945.77</td>
<td>1140.22</td>
<td>1198.79</td>
<td>1268.19</td>
<td>1281.42</td>
<td>1289.47</td>
<td>1296.06</td>
<td>1225.45</td>
<td>1230.32</td>
<td>1268.33</td>
<td>1456.43</td>
<td>1257.18</td>
</tr>
<tr>
<td>geom. mean</td>
<td>927.88</td>
<td>1122.65</td>
<td>1181.1</td>
<td>1249.8</td>
<td>1254.51</td>
<td>1264.49</td>
<td>1279.4</td>
<td>1214.35</td>
<td>1204.07</td>
<td>1248.36</td>
<td>1435.68</td>
<td>1241.85</td>
</tr>
<tr>
<td>median</td>
<td>924.11</td>
<td>1124.71</td>
<td>1174.39</td>
<td>1238.36</td>
<td>1245.9</td>
<td>1269.66</td>
<td>1282.03</td>
<td>1211.97</td>
<td>1212.85</td>
<td>1233.63</td>
<td>1440.12</td>
<td>1243.41</td>
</tr>
<tr>
<td>first quartile</td>
<td>920.36</td>
<td>1115.44</td>
<td>1174.22</td>
<td>1237.22</td>
<td>1236.67</td>
<td>1246.69</td>
<td>1276.72</td>
<td>1209.92</td>
<td>1198.34</td>
<td>1233.45</td>
<td>1420.73</td>
<td>1235.72</td>
</tr>
<tr>
<td>third quartile</td>
<td>935.24</td>
<td>1128.99</td>
<td>1198.68</td>
<td>1260.84</td>
<td>1263.83</td>
<td>1279.59</td>
<td>1283.7</td>
<td>1216.94</td>
<td>1224.94</td>
<td>1270.48</td>
<td>1453.47</td>
<td>1245.72</td>
</tr>
<tr>
<td>minimum</td>
<td>905.19</td>
<td>1097.42</td>
<td>1157.58</td>
<td>1234.58</td>
<td>1228.48</td>
<td>1231.18</td>
<td>1253.35</td>
<td>1200.83</td>
<td>1159.78</td>
<td>1232.86</td>
<td>1406.96</td>
<td>1220.44</td>
</tr>
<tr>
<td>maximum</td>
<td>955.21</td>
<td>1147.29</td>
<td>1201.21</td>
<td>1278.57</td>
<td>1298.91</td>
<td>1296.4</td>
<td>1301.68</td>
<td>1232.31</td>
<td>1225.7</td>
<td>1272.07</td>
<td>1457.76</td>
<td>1264.4</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>-1.41 % </td>
<td>3.67 % </td>
<td>5.54 % </td>
<td>5.46 % </td>
<td>4.3 % </td>
<td>4.71 % </td>
<td>3.47 % </td>
<td>4.82 % </td>
<td>2.5 % </td>
<td>1.8 % </td>
<td>1.56 % </td>
<td>-0.22 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.6358</td>
<td>0.1801</td>
<td>0.0832</td>
<td>0.0747</td>
<td>0.1163</td>
<td>0.0713</td>
<td>0.0462</td>
<td>0.1028</td>
<td>0.1562</td>
<td>0.1267</td>
<td>0.187</td>
<td>0.7579</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>DIFF</td>
<td>DIFF</td>
<td>SAME</td>
<td>DIFF</td>
<td>DIFF</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
</tr>
</table>
<a name="16384"></a> 
<img src="16384.png" alt="16384" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="13">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>16384</td><td>994.34</td><td>1153.39</td><td>1207.74</td><td>1244.17</td><td>1259.25</td><td>1275.81</td><td>1267.93</td><td>1204.46</td><td>1164.56</td><td>1167.38</td><td>1222.94</td><td>1385.29</td><td>1257.27</td></tr>
<tr><td>16384</td><td>937.59</td><td>1071.45</td><td>1134.02</td><td>1213.41</td><td>1223.43</td><td>1235.24</td><td>1255.29</td><td>1159.85</td><td>1135.56</td><td>1159.41</td><td>1201.75</td><td>1358.48</td><td>1249.89</td></tr>
<tr><td>16384</td><td>959.11</td><td>1109.79</td><td>1122.73</td><td>1209.46</td><td>1211.49</td><td>1223.81</td><td>1182.64</td><td>1167.72</td><td>1130.5</td><td>1151.42</td><td>1190.49</td><td>1349.77</td><td>1240.1</td></tr>
<tr><td>16384</td><td>922.51</td><td>1074.85</td><td>1124.76</td><td>1179.75</td><td>1196.26</td><td>1201.57</td><td>1199.23</td><td>1137.33</td><td>1148.36</td><td>1125.9</td><td>1203.64</td><td>1351.7</td><td>1226.9</td></tr>
<tr><td>16384</td><td>918.38</td><td>1060.58</td><td>1116.62</td><td>1148.36</td><td>1166.08</td><td>1204.1</td><td>1220.83</td><td>1131.76</td><td>1112.97</td><td>1147.18</td><td>1197.44</td><td>1348.17</td><td>1237.99</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>946.39</td>
<td>1094.01</td>
<td>1141.18</td>
<td>1199.03</td>
<td>1211.3</td>
<td>1228.11</td>
<td>1225.19</td>
<td>1160.23</td>
<td>1138.39</td>
<td>1150.26</td>
<td>1203.25</td>
<td>1358.68</td>
<td>1242.43</td>
</tr>
<tr>
<td>standard dev.</td>
<td>31.2</td>
<td>37.98</td>
<td>37.73</td>
<td>36.37</td>
<td>34.34</td>
<td>30.11</td>
<td>36.18</td>
<td>28.93</td>
<td>19.37</td>
<td>15.66</td>
<td>12.11</td>
<td>15.39</td>
<td>11.64</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>916.64</td>
<td>1057.8</td>
<td>1105.2</td>
<td>1164.35</td>
<td>1178.56</td>
<td>1199.4</td>
<td>1190.69</td>
<td>1132.64</td>
<td>1119.93</td>
<td>1135.32</td>
<td>1191.7</td>
<td>1344.01</td>
<td>1231.33</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>976.13</td>
<td>1130.22</td>
<td>1177.15</td>
<td>1233.71</td>
<td>1244.04</td>
<td>1256.81</td>
<td>1259.68</td>
<td>1187.81</td>
<td>1156.86</td>
<td>1165.19</td>
<td>1214.8</td>
<td>1373.35</td>
<td>1253.53</td>
</tr>
<tr>
<td>geom. mean</td>
<td>945.98</td>
<td>1093.49</td>
<td>1140.69</td>
<td>1198.59</td>
<td>1210.91</td>
<td>1227.81</td>
<td>1224.76</td>
<td>1159.94</td>
<td>1138.26</td>
<td>1150.17</td>
<td>1203.2</td>
<td>1358.61</td>
<td>1242.39</td>
</tr>
<tr>
<td>median</td>
<td>937.59</td>
<td>1074.85</td>
<td>1124.76</td>
<td>1209.46</td>
<td>1211.49</td>
<td>1223.81</td>
<td>1220.83</td>
<td>1159.85</td>
<td>1135.56</td>
<td>1151.42</td>
<td>1201.75</td>
<td>1351.7</td>
<td>1240.1</td>
</tr>
<tr>
<td>first quartile</td>
<td>922.51</td>
<td>1071.45</td>
<td>1122.73</td>
<td>1179.75</td>
<td>1196.26</td>
<td>1204.1</td>
<td>1199.23</td>
<td>1137.33</td>
<td>1130.5</td>
<td>1147.18</td>
<td>1197.44</td>
<td>1349.77</td>
<td>1237.99</td>
</tr>
<tr>
<td>third quartile</td>
<td>959.11</td>
<td>1109.79</td>
<td>1134.02</td>
<td>1213.41</td>
<td>1223.43</td>
<td>1235.24</td>
<td>1255.29</td>
<td>1167.72</td>
<td>1148.36</td>
<td>1159.41</td>
<td>1203.64</td>
<td>1358.48</td>
<td>1249.89</td>
</tr>
<tr>
<td>minimum</td>
<td>918.38</td>
<td>1060.58</td>
<td>1116.62</td>
<td>1148.36</td>
<td>1166.08</td>
<td>1201.57</td>
<td>1182.64</td>
<td>1131.76</td>
<td>1112.97</td>
<td>1125.9</td>
<td>1190.49</td>
<td>1348.17</td>
<td>1226.9</td>
</tr>
<tr>
<td>maximum</td>
<td>994.34</td>
<td>1153.39</td>
<td>1207.74</td>
<td>1244.17</td>
<td>1259.25</td>
<td>1275.81</td>
<td>1267.93</td>
<td>1204.46</td>
<td>1164.56</td>
<td>1167.38</td>
<td>1222.94</td>
<td>1385.29</td>
<td>1257.27</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>16384</td><td>951.98</td><td>1139.86</td><td>1210.0</td><td>1260.93</td><td>1285.64</td><td>1282.18</td><td>1261.64</td><td>1213.68</td><td>1168.31</td><td>1182.56</td><td>1217.66</td><td>1358.35</td><td>1231.13</td></tr>
<tr><td>16384</td><td>946.18</td><td>1091.54</td><td>1188.7</td><td>1253.91</td><td>1249.61</td><td>1252.25</td><td>1261.73</td><td>1203.47</td><td>1171.04</td><td>1175.62</td><td>1217.29</td><td>1366.0</td><td>1244.95</td></tr>
<tr><td>16384</td><td>954.83</td><td>1126.2</td><td>1227.28</td><td>1259.84</td><td>1261.45</td><td>1269.03</td><td>1262.33</td><td>1199.77</td><td>1185.69</td><td>1171.39</td><td>1215.44</td><td>1366.12</td><td>1262.42</td></tr>
<tr><td>16384</td><td>944.07</td><td>1097.54</td><td>1193.16</td><td>1238.77</td><td>1256.98</td><td>1239.64</td><td>1250.59</td><td>1173.97</td><td>1185.02</td><td>1157.07</td><td>1205.35</td><td>1349.31</td><td>1247.66</td></tr>
<tr><td>16384</td><td>943.56</td><td>1105.04</td><td>1179.34</td><td>1236.08</td><td>1259.55</td><td>1274.0</td><td>1268.03</td><td>1200.48</td><td>1161.6</td><td>1168.9</td><td>1218.19</td><td>1372.32</td><td>1240.39</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>948.12</td>
<td>1112.03</td>
<td>1199.7</td>
<td>1249.9</td>
<td>1262.65</td>
<td>1263.42</td>
<td>1260.86</td>
<td>1198.27</td>
<td>1174.33</td>
<td>1171.11</td>
<td>1214.79</td>
<td>1362.42</td>
<td>1245.31</td>
</tr>
<tr>
<td>standard dev.</td>
<td>5.02</td>
<td>20.33</td>
<td>19.01</td>
<td>11.74</td>
<td>13.62</td>
<td>17.22</td>
<td>6.33</td>
<td>14.68</td>
<td>10.64</td>
<td>9.4</td>
<td>5.38</td>
<td>8.85</td>
<td>11.44</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>943.34</td>
<td>1092.65</td>
<td>1181.57</td>
<td>1238.71</td>
<td>1249.67</td>
<td>1247.0</td>
<td>1254.83</td>
<td>1184.28</td>
<td>1164.19</td>
<td>1162.15</td>
<td>1209.66</td>
<td>1353.98</td>
<td>1234.4</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>952.91</td>
<td>1131.42</td>
<td>1217.82</td>
<td>1261.1</td>
<td>1275.63</td>
<td>1279.83</td>
<td>1266.9</td>
<td>1212.27</td>
<td>1184.48</td>
<td>1180.07</td>
<td>1219.91</td>
<td>1370.85</td>
<td>1256.22</td>
</tr>
<tr>
<td>geom. mean</td>
<td>948.11</td>
<td>1111.89</td>
<td>1199.58</td>
<td>1249.86</td>
<td>1262.59</td>
<td>1263.32</td>
<td>1260.85</td>
<td>1198.2</td>
<td>1174.3</td>
<td>1171.08</td>
<td>1214.78</td>
<td>1362.4</td>
<td>1245.27</td>
</tr>
<tr>
<td>median</td>
<td>946.18</td>
<td>1105.04</td>
<td>1193.16</td>
<td>1253.91</td>
<td>1259.55</td>
<td>1269.03</td>
<td>1261.73</td>
<td>1200.48</td>
<td>1171.04</td>
<td>1171.39</td>
<td>1217.29</td>
<td>1366.0</td>
<td>1244.95</td>
</tr>
<tr>
<td>first quartile</td>
<td>944.07</td>
<td>1097.54</td>
<td>1188.7</td>
<td>1238.77</td>
<td>1256.98</td>
<td>1252.25</td>
<td>1261.64</td>
<td>1199.77</td>
<td>1168.31</td>
<td>1168.9</td>
<td>1215.44</td>
<td>1358.35</td>
<td>1240.39</td>
</tr>
<tr>
<td>third quartile</td>
<td>951.98</td>
<td>1126.2</td>
<td>1210.0</td>
<td>1259.84</td>
<td>1261.45</td>
<td>1274.0</td>
<td>1262.33</td>
<td>1203.47</td>
<td>1185.02</td>
<td>1175.62</td>
<td>1217.66</td>
<td>1366.12</td>
<td>1247.66</td>
</tr>
<tr>
<td>minimum</td>
<td>943.56</td>
<td>1091.54</td>
<td>1179.34</td>
<td>1236.08</td>
<td>1249.61</td>
<td>1239.64</td>
<td>1250.59</td>
<td>1173.97</td>
<td>1161.6</td>
<td>1157.07</td>
<td>1205.35</td>
<td>1349.31</td>
<td>1231.13</td>
</tr>
<tr>
<td>maximum</td>
<td>954.83</td>
<td>1139.86</td>
<td>1227.28</td>
<td>1260.93</td>
<td>1285.64</td>
<td>1282.18</td>
<td>1268.03</td>
<td>1213.68</td>
<td>1185.69</td>
<td>1182.56</td>
<td>1218.19</td>
<td>1372.32</td>
<td>1262.42</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>0.18 % </td>
<td>1.65 % </td>
<td>5.13 % </td>
<td>4.24 % </td>
<td>4.24 % </td>
<td>2.88 % </td>
<td>2.91 % </td>
<td>3.28 % </td>
<td>3.16 % </td>
<td>1.81 % </td>
<td>0.96 % </td>
<td>0.28 % </td>
<td>0.23 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.9052</td>
<td>0.3769</td>
<td>0.0147</td>
<td>0.0177</td>
<td>0.0145</td>
<td>0.0523</td>
<td>0.0616</td>
<td>0.0305</td>
<td>0.0066</td>
<td>0.034</td>
<td>0.0875</td>
<td>0.6504</td>
<td>0.7032</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>SAME</td>
<td>SAME</td>
</tr>
</table>
<a name="32768"></a> 
<img src="32768.png" alt="32768" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>32768</td><td>1274.44</td><td>1259.49</td><td>1263.82</td><td>1198.63</td><td>1147.61</td><td>1140.9</td><td>1142.61</td><td>1208.88</td><td>1373.45</td></tr>
<tr><td>32768</td><td>1259.29</td><td>1240.27</td><td>1245.38</td><td>1177.9</td><td>1140.05</td><td>1119.35</td><td>1119.58</td><td>1180.2</td><td>1353.7</td></tr>
<tr><td>32768</td><td>1207.18</td><td>1214.56</td><td>1247.66</td><td>1162.28</td><td>1123.95</td><td>1116.89</td><td>1116.31</td><td>1185.67</td><td>1357.95</td></tr>
<tr><td>32768</td><td>1218.86</td><td>1219.1</td><td>1225.91</td><td>1162.16</td><td>1135.4</td><td>1127.2</td><td>1125.29</td><td>1190.09</td><td>1362.63</td></tr>
<tr><td>32768</td><td>1218.77</td><td>1227.42</td><td>1218.49</td><td>1159.92</td><td>1125.13</td><td>1120.06</td><td>1107.54</td><td>1168.14</td><td>1358.47</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1235.71</td>
<td>1232.17</td>
<td>1240.25</td>
<td>1172.18</td>
<td>1134.43</td>
<td>1124.88</td>
<td>1122.27</td>
<td>1186.59</td>
<td>1361.24</td>
</tr>
<tr>
<td>standard dev.</td>
<td>29.33</td>
<td>18.14</td>
<td>18.14</td>
<td>16.44</td>
<td>10.03</td>
<td>9.74</td>
<td>13.06</td>
<td>14.93</td>
<td>7.53</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1207.74</td>
<td>1214.88</td>
<td>1222.96</td>
<td>1156.51</td>
<td>1124.86</td>
<td>1115.59</td>
<td>1109.81</td>
<td>1172.36</td>
<td>1354.07</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1263.67</td>
<td>1249.46</td>
<td>1257.54</td>
<td>1187.85</td>
<td>1143.99</td>
<td>1134.17</td>
<td>1134.72</td>
<td>1200.82</td>
<td>1368.41</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1235.43</td>
<td>1232.06</td>
<td>1240.15</td>
<td>1172.09</td>
<td>1134.39</td>
<td>1124.85</td>
<td>1122.2</td>
<td>1186.52</td>
<td>1361.22</td>
</tr>
<tr>
<td>median</td>
<td>1218.86</td>
<td>1227.42</td>
<td>1245.38</td>
<td>1162.28</td>
<td>1135.4</td>
<td>1120.06</td>
<td>1119.58</td>
<td>1185.67</td>
<td>1358.47</td>
</tr>
<tr>
<td>first quartile</td>
<td>1218.77</td>
<td>1219.1</td>
<td>1225.91</td>
<td>1162.16</td>
<td>1125.13</td>
<td>1119.35</td>
<td>1116.31</td>
<td>1180.2</td>
<td>1357.95</td>
</tr>
<tr>
<td>third quartile</td>
<td>1259.29</td>
<td>1240.27</td>
<td>1247.66</td>
<td>1177.9</td>
<td>1140.05</td>
<td>1127.2</td>
<td>1125.29</td>
<td>1190.09</td>
<td>1362.63</td>
</tr>
<tr>
<td>minimum</td>
<td>1207.18</td>
<td>1214.56</td>
<td>1218.49</td>
<td>1159.92</td>
<td>1123.95</td>
<td>1116.89</td>
<td>1107.54</td>
<td>1168.14</td>
<td>1353.7</td>
</tr>
<tr>
<td>maximum</td>
<td>1274.44</td>
<td>1259.49</td>
<td>1263.82</td>
<td>1198.63</td>
<td>1147.61</td>
<td>1140.9</td>
<td>1142.61</td>
<td>1208.88</td>
<td>1373.45</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>32768</td><td>1281.68</td><td>1276.13</td><td>1274.3</td><td>1195.01</td><td>1160.1</td><td>1138.31</td><td>1125.38</td><td>1162.32</td><td>1351.75</td></tr>
<tr><td>32768</td><td>1271.81</td><td>1247.37</td><td>1256.43</td><td>1191.81</td><td>1151.86</td><td>1138.98</td><td>1130.23</td><td>1166.94</td><td>1362.27</td></tr>
<tr><td>32768</td><td>1280.4</td><td>1270.39</td><td>1282.57</td><td>1199.98</td><td>1175.43</td><td>1150.33</td><td>1145.56</td><td>1188.32</td><td>1375.04</td></tr>
<tr><td>32768</td><td>1269.04</td><td>1259.0</td><td>1287.83</td><td>1181.68</td><td>1145.52</td><td>1137.94</td><td>1118.03</td><td>1180.85</td><td>1359.16</td></tr>
<tr><td>32768</td><td>1269.9</td><td>1261.93</td><td>1257.17</td><td>1196.27</td><td>1156.86</td><td>1137.66</td><td>1132.78</td><td>1178.85</td><td>1364.61</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1274.57</td>
<td>1262.96</td>
<td>1271.66</td>
<td>1192.95</td>
<td>1157.95</td>
<td>1140.64</td>
<td>1130.39</td>
<td>1175.46</td>
<td>1362.57</td>
</tr>
<tr>
<td>standard dev.</td>
<td>6.01</td>
<td>11.05</td>
<td>14.4</td>
<td>6.95</td>
<td>11.22</td>
<td>5.44</td>
<td>10.17</td>
<td>10.62</td>
<td>8.49</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1268.83</td>
<td>1252.43</td>
<td>1257.93</td>
<td>1186.33</td>
<td>1147.26</td>
<td>1135.46</td>
<td>1120.7</td>
<td>1165.33</td>
<td>1354.47</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1280.3</td>
<td>1273.5</td>
<td>1285.39</td>
<td>1199.57</td>
<td>1168.65</td>
<td>1145.83</td>
<td>1140.09</td>
<td>1185.58</td>
<td>1370.66</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1274.56</td>
<td>1262.92</td>
<td>1271.59</td>
<td>1192.93</td>
<td>1157.91</td>
<td>1140.63</td>
<td>1130.36</td>
<td>1175.42</td>
<td>1362.55</td>
</tr>
<tr>
<td>median</td>
<td>1271.81</td>
<td>1261.93</td>
<td>1274.3</td>
<td>1195.01</td>
<td>1156.86</td>
<td>1138.31</td>
<td>1130.23</td>
<td>1178.85</td>
<td>1362.27</td>
</tr>
<tr>
<td>first quartile</td>
<td>1269.9</td>
<td>1259.0</td>
<td>1257.17</td>
<td>1191.81</td>
<td>1151.86</td>
<td>1137.94</td>
<td>1125.38</td>
<td>1166.94</td>
<td>1359.16</td>
</tr>
<tr>
<td>third quartile</td>
<td>1280.4</td>
<td>1270.39</td>
<td>1282.57</td>
<td>1196.27</td>
<td>1160.1</td>
<td>1138.98</td>
<td>1132.78</td>
<td>1180.85</td>
<td>1364.61</td>
</tr>
<tr>
<td>minimum</td>
<td>1269.04</td>
<td>1247.37</td>
<td>1256.43</td>
<td>1181.68</td>
<td>1145.52</td>
<td>1137.66</td>
<td>1118.03</td>
<td>1162.32</td>
<td>1351.75</td>
</tr>
<tr>
<td>maximum</td>
<td>1281.68</td>
<td>1276.13</td>
<td>1287.83</td>
<td>1199.98</td>
<td>1175.43</td>
<td>1150.33</td>
<td>1145.56</td>
<td>1188.32</td>
<td>1375.04</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>3.14 % </td>
<td>2.5 % </td>
<td>2.53 % </td>
<td>1.77 % </td>
<td>2.07 % </td>
<td>1.4 % </td>
<td>0.72 % </td>
<td>-0.94 % </td>
<td>0.1 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0198</td>
<td>0.0118</td>
<td>0.0162</td>
<td>0.0315</td>
<td>0.0081</td>
<td>0.0134</td>
<td>0.3042</td>
<td>0.211</td>
<td>0.8003</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
</tr>
</table>
<a name="65536"></a> 
<img src="65536.png" alt="65536" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>65536</td><td>1267.4</td><td>1258.01</td><td>1264.45</td><td>1186.26</td><td>1150.17</td><td>1129.48</td><td>1103.52</td><td>1134.11</td><td>1207.05</td></tr>
<tr><td>65536</td><td>1251.69</td><td>1245.03</td><td>1250.91</td><td>1178.1</td><td>1143.14</td><td>1112.04</td><td>1097.06</td><td>1111.81</td><td>1193.32</td></tr>
<tr><td>65536</td><td>1229.92</td><td>1231.15</td><td>1220.61</td><td>1173.69</td><td>1127.63</td><td>1110.44</td><td>1082.67</td><td>1109.59</td><td>1175.26</td></tr>
<tr><td>65536</td><td>1227.16</td><td>1234.57</td><td>1244.63</td><td>1173.32</td><td>1130.44</td><td>1104.27</td><td>1083.37</td><td>1095.25</td><td>1183.74</td></tr>
<tr><td>65536</td><td>1237.24</td><td>1225.96</td><td>1238.99</td><td>1166.54</td><td>1118.63</td><td>1106.0</td><td>1090.58</td><td>1121.21</td><td>1184.64</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1242.68</td>
<td>1238.94</td>
<td>1243.92</td>
<td>1175.58</td>
<td>1134.0</td>
<td>1112.45</td>
<td>1091.44</td>
<td>1114.39</td>
<td>1188.8</td>
</tr>
<tr>
<td>standard dev.</td>
<td>16.78</td>
<td>12.74</td>
<td>16.11</td>
<td>7.26</td>
<td>12.59</td>
<td>10.04</td>
<td>8.95</td>
<td>14.42</td>
<td>12.04</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1226.69</td>
<td>1226.8</td>
<td>1228.55</td>
<td>1168.66</td>
<td>1121.99</td>
<td>1102.88</td>
<td>1082.91</td>
<td>1100.65</td>
<td>1177.32</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1258.67</td>
<td>1251.09</td>
<td>1259.28</td>
<td>1182.5</td>
<td>1146.01</td>
<td>1122.01</td>
<td>1099.97</td>
<td>1128.14</td>
<td>1200.28</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1242.59</td>
<td>1238.89</td>
<td>1243.83</td>
<td>1175.57</td>
<td>1133.95</td>
<td>1112.41</td>
<td>1091.41</td>
<td>1114.32</td>
<td>1188.75</td>
</tr>
<tr>
<td>median</td>
<td>1237.24</td>
<td>1234.57</td>
<td>1244.63</td>
<td>1173.69</td>
<td>1130.44</td>
<td>1110.44</td>
<td>1090.58</td>
<td>1111.81</td>
<td>1184.64</td>
</tr>
<tr>
<td>first quartile</td>
<td>1229.92</td>
<td>1231.15</td>
<td>1238.99</td>
<td>1173.32</td>
<td>1127.63</td>
<td>1106.0</td>
<td>1083.37</td>
<td>1109.59</td>
<td>1183.74</td>
</tr>
<tr>
<td>third quartile</td>
<td>1251.69</td>
<td>1245.03</td>
<td>1250.91</td>
<td>1178.1</td>
<td>1143.14</td>
<td>1112.04</td>
<td>1097.06</td>
<td>1121.21</td>
<td>1193.32</td>
</tr>
<tr>
<td>minimum</td>
<td>1227.16</td>
<td>1225.96</td>
<td>1220.61</td>
<td>1166.54</td>
<td>1118.63</td>
<td>1104.27</td>
<td>1082.67</td>
<td>1095.25</td>
<td>1175.26</td>
</tr>
<tr>
<td>maximum</td>
<td>1267.4</td>
<td>1258.01</td>
<td>1264.45</td>
<td>1186.26</td>
<td>1150.17</td>
<td>1129.48</td>
<td>1103.52</td>
<td>1134.11</td>
<td>1207.05</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>65536</td><td>1279.84</td><td>1279.49</td><td>1264.89</td><td>1192.41</td><td>1149.49</td><td>1129.58</td><td>1100.73</td><td>1106.86</td><td>1185.12</td></tr>
<tr><td>65536</td><td>1277.06</td><td>1261.73</td><td>1272.65</td><td>1196.29</td><td>1147.24</td><td>1123.97</td><td>1097.88</td><td>1105.49</td><td>1180.16</td></tr>
<tr><td>65536</td><td>1277.29</td><td>1280.2</td><td>1275.41</td><td>1204.55</td><td>1158.56</td><td>1135.6</td><td>1099.79</td><td>1123.24</td><td>1199.58</td></tr>
<tr><td>65536</td><td>1270.42</td><td>1268.51</td><td>1267.78</td><td>1195.03</td><td>1155.13</td><td>1129.54</td><td>1091.42</td><td>1112.44</td><td>1182.08</td></tr>
<tr><td>65536</td><td>1244.31</td><td>1270.19</td><td>1263.33</td><td>1192.47</td><td>1143.33</td><td>1116.37</td><td>1100.79</td><td>1115.97</td><td>1184.62</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1269.79</td>
<td>1272.02</td>
<td>1268.81</td>
<td>1196.15</td>
<td>1150.75</td>
<td>1127.01</td>
<td>1098.12</td>
<td>1112.8</td>
<td>1186.31</td>
</tr>
<tr>
<td>standard dev.</td>
<td>14.66</td>
<td>7.81</td>
<td>5.12</td>
<td>4.98</td>
<td>6.11</td>
<td>7.23</td>
<td>3.93</td>
<td>7.21</td>
<td>7.68</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1255.81</td>
<td>1264.57</td>
<td>1263.93</td>
<td>1191.4</td>
<td>1144.93</td>
<td>1120.11</td>
<td>1094.38</td>
<td>1105.93</td>
<td>1178.99</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1283.76</td>
<td>1279.48</td>
<td>1273.69</td>
<td>1200.9</td>
<td>1156.57</td>
<td>1133.91</td>
<td>1101.87</td>
<td>1119.67</td>
<td>1193.63</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1269.72</td>
<td>1272.01</td>
<td>1268.8</td>
<td>1196.14</td>
<td>1150.74</td>
<td>1126.99</td>
<td>1098.12</td>
<td>1112.78</td>
<td>1186.29</td>
</tr>
<tr>
<td>median</td>
<td>1277.06</td>
<td>1270.19</td>
<td>1267.78</td>
<td>1195.03</td>
<td>1149.49</td>
<td>1129.54</td>
<td>1099.79</td>
<td>1112.44</td>
<td>1184.62</td>
</tr>
<tr>
<td>first quartile</td>
<td>1270.42</td>
<td>1268.51</td>
<td>1264.89</td>
<td>1192.47</td>
<td>1147.24</td>
<td>1123.97</td>
<td>1097.88</td>
<td>1106.86</td>
<td>1182.08</td>
</tr>
<tr>
<td>third quartile</td>
<td>1277.29</td>
<td>1279.49</td>
<td>1272.65</td>
<td>1196.29</td>
<td>1155.13</td>
<td>1129.58</td>
<td>1100.73</td>
<td>1115.97</td>
<td>1185.12</td>
</tr>
<tr>
<td>minimum</td>
<td>1244.31</td>
<td>1261.73</td>
<td>1263.33</td>
<td>1192.41</td>
<td>1143.33</td>
<td>1116.37</td>
<td>1091.42</td>
<td>1105.49</td>
<td>1180.16</td>
</tr>
<tr>
<td>maximum</td>
<td>1279.84</td>
<td>1280.2</td>
<td>1275.41</td>
<td>1204.55</td>
<td>1158.56</td>
<td>1135.6</td>
<td>1100.79</td>
<td>1123.24</td>
<td>1199.58</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>2.18 % </td>
<td>2.67 % </td>
<td>2.0 % </td>
<td>1.75 % </td>
<td>1.48 % </td>
<td>1.31 % </td>
<td>0.61 % </td>
<td>-0.14 % </td>
<td>-0.21 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0262</td>
<td>0.0011</td>
<td>0.011</td>
<td>0.0008</td>
<td>0.0281</td>
<td>0.0301</td>
<td>0.1648</td>
<td>0.8307</td>
<td>0.7068</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
</tr>
</table>
<a name="131072"></a> 
<img src="131072.png" alt="131072" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>131072</td><td>1272.08</td><td>1265.82</td><td>1266.67</td><td>1188.99</td><td>1153.08</td><td>1123.91</td><td>1080.68</td><td>1101.45</td><td>1130.78</td></tr>
<tr><td>131072</td><td>1257.59</td><td>1247.77</td><td>1236.37</td><td>1176.94</td><td>1141.56</td><td>1108.86</td><td>1083.16</td><td>1084.96</td><td>1119.91</td></tr>
<tr><td>131072</td><td>1251.92</td><td>1235.81</td><td>1239.2</td><td>1150.41</td><td>1125.22</td><td>1105.33</td><td>1077.61</td><td>1077.87</td><td>1117.09</td></tr>
<tr><td>131072</td><td>1703.98</td><td>1241.15</td><td>1704.25</td><td>1412.38</td><td>1278.64</td><td>1467.94</td><td>1196.15</td><td>1192.28</td><td>1115.8</td></tr>
<tr><td>131072</td><td>1230.57</td><td>1224.63</td><td>1218.08</td><td>1156.75</td><td>1130.52</td><td>1100.38</td><td>1064.87</td><td>1076.04</td><td>1119.07</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1343.23</td>
<td>1243.04</td>
<td>1332.92</td>
<td>1217.09</td>
<td>1165.8</td>
<td>1181.28</td>
<td>1100.49</td>
<td>1106.52</td>
<td>1120.53</td>
</tr>
<tr>
<td>standard dev.</td>
<td>202.22</td>
<td>15.3</td>
<td>208.31</td>
<td>110.26</td>
<td>63.98</td>
<td>160.49</td>
<td>53.94</td>
<td>48.98</td>
<td>5.95</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1150.43</td>
<td>1228.45</td>
<td>1134.32</td>
<td>1111.97</td>
<td>1104.8</td>
<td>1028.28</td>
<td>1049.07</td>
<td>1059.82</td>
<td>1114.85</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1536.02</td>
<td>1257.62</td>
<td>1531.52</td>
<td>1322.21</td>
<td>1226.8</td>
<td>1334.29</td>
<td>1151.91</td>
<td>1153.22</td>
<td>1126.21</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1332.42</td>
<td>1242.96</td>
<td>1321.4</td>
<td>1213.37</td>
<td>1164.46</td>
<td>1173.46</td>
<td>1099.48</td>
<td>1105.68</td>
<td>1120.52</td>
</tr>
<tr>
<td>median</td>
<td>1257.59</td>
<td>1241.15</td>
<td>1239.2</td>
<td>1176.94</td>
<td>1141.56</td>
<td>1108.86</td>
<td>1080.68</td>
<td>1084.96</td>
<td>1119.07</td>
</tr>
<tr>
<td>first quartile</td>
<td>1251.92</td>
<td>1235.81</td>
<td>1236.37</td>
<td>1156.75</td>
<td>1130.52</td>
<td>1105.33</td>
<td>1077.61</td>
<td>1077.87</td>
<td>1117.09</td>
</tr>
<tr>
<td>third quartile</td>
<td>1272.08</td>
<td>1247.77</td>
<td>1266.67</td>
<td>1188.99</td>
<td>1153.08</td>
<td>1123.91</td>
<td>1083.16</td>
<td>1101.45</td>
<td>1119.91</td>
</tr>
<tr>
<td>minimum</td>
<td>1230.57</td>
<td>1224.63</td>
<td>1218.08</td>
<td>1150.41</td>
<td>1125.22</td>
<td>1100.38</td>
<td>1064.87</td>
<td>1076.04</td>
<td>1115.8</td>
</tr>
<tr>
<td>maximum</td>
<td>1703.98</td>
<td>1265.82</td>
<td>1704.25</td>
<td>1412.38</td>
<td>1278.64</td>
<td>1467.94</td>
<td>1196.15</td>
<td>1192.28</td>
<td>1130.78</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>131072</td><td>1279.75</td><td>1274.57</td><td>1278.15</td><td>1197.1</td><td>1151.08</td><td>1127.25</td><td>1089.06</td><td>1082.74</td><td>1128.31</td></tr>
<tr><td>131072</td><td>1272.01</td><td>1254.76</td><td>1257.37</td><td>1198.21</td><td>1150.05</td><td>1127.73</td><td>1084.12</td><td>1088.16</td><td>1118.56</td></tr>
<tr><td>131072</td><td>1278.57</td><td>1270.18</td><td>1275.4</td><td>1208.07</td><td>1156.25</td><td>1134.79</td><td>1092.63</td><td>1082.0</td><td>1130.87</td></tr>
<tr><td>131072</td><td>1269.34</td><td>1265.75</td><td>1275.98</td><td>1202.58</td><td>1153.65</td><td>1118.88</td><td>1083.62</td><td>1084.08</td><td>1115.62</td></tr>
<tr><td>131072</td><td>1292.46</td><td>1269.92</td><td>1279.05</td><td>1193.31</td><td>1157.83</td><td>1124.95</td><td>1088.18</td><td>1082.28</td><td>1114.76</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1278.42</td>
<td>1267.03</td>
<td>1273.19</td>
<td>1199.85</td>
<td>1153.77</td>
<td>1126.72</td>
<td>1087.52</td>
<td>1083.85</td>
<td>1121.62</td>
</tr>
<tr>
<td>standard dev.</td>
<td>8.98</td>
<td>7.54</td>
<td>8.97</td>
<td>5.66</td>
<td>3.31</td>
<td>5.72</td>
<td>3.73</td>
<td>2.54</td>
<td>7.46</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1269.87</td>
<td>1259.85</td>
<td>1264.64</td>
<td>1194.46</td>
<td>1150.62</td>
<td>1121.26</td>
<td>1083.96</td>
<td>1081.44</td>
<td>1114.51</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1286.98</td>
<td>1274.22</td>
<td>1281.74</td>
<td>1205.25</td>
<td>1156.93</td>
<td>1132.18</td>
<td>1091.08</td>
<td>1086.27</td>
<td>1128.74</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1278.4</td>
<td>1267.02</td>
<td>1273.16</td>
<td>1199.84</td>
<td>1153.77</td>
<td>1126.71</td>
<td>1087.52</td>
<td>1083.85</td>
<td>1121.6</td>
</tr>
<tr>
<td>median</td>
<td>1278.57</td>
<td>1269.92</td>
<td>1275.98</td>
<td>1198.21</td>
<td>1153.65</td>
<td>1127.25</td>
<td>1088.18</td>
<td>1082.74</td>
<td>1118.56</td>
</tr>
<tr>
<td>first quartile</td>
<td>1272.01</td>
<td>1265.75</td>
<td>1275.4</td>
<td>1197.1</td>
<td>1151.08</td>
<td>1124.95</td>
<td>1084.12</td>
<td>1082.28</td>
<td>1115.62</td>
</tr>
<tr>
<td>third quartile</td>
<td>1279.75</td>
<td>1270.18</td>
<td>1278.15</td>
<td>1202.58</td>
<td>1156.25</td>
<td>1127.73</td>
<td>1089.06</td>
<td>1084.08</td>
<td>1128.31</td>
</tr>
<tr>
<td>minimum</td>
<td>1269.34</td>
<td>1254.76</td>
<td>1257.37</td>
<td>1193.31</td>
<td>1150.05</td>
<td>1118.88</td>
<td>1083.62</td>
<td>1082.0</td>
<td>1114.76</td>
</tr>
<tr>
<td>maximum</td>
<td>1292.46</td>
<td>1274.57</td>
<td>1279.05</td>
<td>1208.07</td>
<td>1157.83</td>
<td>1134.79</td>
<td>1092.63</td>
<td>1088.16</td>
<td>1130.87</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>-4.82 % </td>
<td>1.93 % </td>
<td>-4.48 % </td>
<td>-1.42 % </td>
<td>-1.03 % </td>
<td>-4.62 % </td>
<td>-1.18 % </td>
<td>-2.05 % </td>
<td>0.1 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.4944</td>
<td>0.0137</td>
<td>0.5397</td>
<td>0.736</td>
<td>0.6856</td>
<td>0.4692</td>
<td>0.6063</td>
<td>0.3316</td>
<td>0.8047</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>DIFF</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
</tr>
</table>
<a name="262144"></a> 
<img src="262144.png" alt="262144" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>262144</td><td>1262.29</td><td>1274.01</td><td>1263.11</td><td>1194.89</td><td>1158.83</td><td>1125.96</td><td>1183.0</td><td>1251.37</td><td>1171.16</td></tr>
<tr><td>262144</td><td>1261.09</td><td>1298.95</td><td>1256.68</td><td>1238.63</td><td>1264.9</td><td>1183.16</td><td>1228.59</td><td>1163.37</td><td>1130.13</td></tr>
<tr><td>262144</td><td>1343.76</td><td>1248.67</td><td>1327.99</td><td>1324.34</td><td>1198.59</td><td>1188.18</td><td>1230.93</td><td>1067.56</td><td>1236.42</td></tr>
<tr><td>262144</td><td>1373.73</td><td>1412.33</td><td>1723.71</td><td>1332.9</td><td>1322.01</td><td>1183.27</td><td>1187.39</td><td>1189.38</td><td>1326.97</td></tr>
<tr><td>262144</td><td>1306.12</td><td>1296.86</td><td>1360.9</td><td>1324.72</td><td>1135.92</td><td>1101.26</td><td>1223.5</td><td>1176.87</td><td>1089.59</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1309.4</td>
<td>1306.16</td>
<td>1386.48</td>
<td>1283.1</td>
<td>1216.05</td>
<td>1156.37</td>
<td>1210.68</td>
<td>1169.71</td>
<td>1190.86</td>
</tr>
<tr>
<td>standard dev.</td>
<td>49.71</td>
<td>62.75</td>
<td>193.56</td>
<td>62.59</td>
<td>76.84</td>
<td>40.05</td>
<td>23.47</td>
<td>66.3</td>
<td>93.45</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1262.01</td>
<td>1246.34</td>
<td>1201.93</td>
<td>1223.42</td>
<td>1142.79</td>
<td>1118.19</td>
<td>1188.31</td>
<td>1106.5</td>
<td>1101.76</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1356.79</td>
<td>1365.99</td>
<td>1571.02</td>
<td>1342.77</td>
<td>1289.31</td>
<td>1194.55</td>
<td>1233.06</td>
<td>1232.92</td>
<td>1279.95</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1308.65</td>
<td>1304.99</td>
<td>1376.67</td>
<td>1281.85</td>
<td>1214.13</td>
<td>1155.81</td>
<td>1210.5</td>
<td>1168.18</td>
<td>1187.98</td>
</tr>
<tr>
<td>median</td>
<td>1306.12</td>
<td>1296.86</td>
<td>1327.99</td>
<td>1324.34</td>
<td>1198.59</td>
<td>1183.16</td>
<td>1223.5</td>
<td>1176.87</td>
<td>1171.16</td>
</tr>
<tr>
<td>first quartile</td>
<td>1262.29</td>
<td>1274.01</td>
<td>1263.11</td>
<td>1238.63</td>
<td>1158.83</td>
<td>1125.96</td>
<td>1187.39</td>
<td>1163.37</td>
<td>1130.13</td>
</tr>
<tr>
<td>third quartile</td>
<td>1343.76</td>
<td>1298.95</td>
<td>1360.9</td>
<td>1324.72</td>
<td>1264.9</td>
<td>1183.27</td>
<td>1228.59</td>
<td>1189.38</td>
<td>1236.42</td>
</tr>
<tr>
<td>minimum</td>
<td>1261.09</td>
<td>1248.67</td>
<td>1256.68</td>
<td>1194.89</td>
<td>1135.92</td>
<td>1101.26</td>
<td>1183.0</td>
<td>1067.56</td>
<td>1089.59</td>
</tr>
<tr>
<td>maximum</td>
<td>1373.73</td>
<td>1412.33</td>
<td>1723.71</td>
<td>1332.9</td>
<td>1322.01</td>
<td>1188.18</td>
<td>1230.93</td>
<td>1251.37</td>
<td>1326.97</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>262144</td><td>1282.15</td><td>1280.36</td><td>1294.03</td><td>1389.91</td><td>1279.38</td><td>1187.19</td><td>1220.03</td><td>1115.14</td><td>1097.03</td></tr>
<tr><td>262144</td><td>1367.79</td><td>1274.75</td><td>1290.52</td><td>1509.0</td><td>1285.41</td><td>1204.37</td><td>1170.17</td><td>1134.75</td><td>1144.31</td></tr>
<tr><td>262144</td><td>1269.32</td><td>1268.88</td><td>1273.05</td><td>1199.47</td><td>1309.96</td><td>1166.42</td><td>1235.9</td><td>1308.93</td><td>1146.53</td></tr>
<tr><td>262144</td><td>1302.41</td><td>1273.54</td><td>1277.28</td><td>1204.03</td><td>1333.55</td><td>1199.73</td><td>1251.24</td><td>1190.79</td><td>1146.22</td></tr>
<tr><td>262144</td><td>1273.84</td><td>1278.43</td><td>1269.77</td><td>1197.96</td><td>1327.99</td><td>1181.46</td><td>1119.12</td><td>1203.79</td><td>1130.79</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1299.1</td>
<td>1275.19</td>
<td>1280.93</td>
<td>1300.08</td>
<td>1307.26</td>
<td>1187.83</td>
<td>1199.29</td>
<td>1190.68</td>
<td>1132.97</td>
</tr>
<tr>
<td>standard dev.</td>
<td>40.44</td>
<td>4.47</td>
<td>10.77</td>
<td>142.74</td>
<td>24.4</td>
<td>15.12</td>
<td>54.18</td>
<td>75.81</td>
<td>21.12</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1260.55</td>
<td>1270.93</td>
<td>1270.67</td>
<td>1163.99</td>
<td>1283.99</td>
<td>1173.42</td>
<td>1147.63</td>
<td>1118.4</td>
<td>1112.84</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1337.66</td>
<td>1279.45</td>
<td>1291.19</td>
<td>1436.16</td>
<td>1330.53</td>
<td>1202.25</td>
<td>1250.95</td>
<td>1262.96</td>
<td>1153.11</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1298.61</td>
<td>1275.18</td>
<td>1280.89</td>
<td>1294.05</td>
<td>1307.08</td>
<td>1187.76</td>
<td>1198.3</td>
<td>1188.79</td>
<td>1132.81</td>
</tr>
<tr>
<td>median</td>
<td>1282.15</td>
<td>1274.75</td>
<td>1277.28</td>
<td>1204.03</td>
<td>1309.96</td>
<td>1187.19</td>
<td>1220.03</td>
<td>1190.79</td>
<td>1144.31</td>
</tr>
<tr>
<td>first quartile</td>
<td>1273.84</td>
<td>1273.54</td>
<td>1273.05</td>
<td>1199.47</td>
<td>1285.41</td>
<td>1181.46</td>
<td>1170.17</td>
<td>1134.75</td>
<td>1130.79</td>
</tr>
<tr>
<td>third quartile</td>
<td>1302.41</td>
<td>1278.43</td>
<td>1290.52</td>
<td>1389.91</td>
<td>1327.99</td>
<td>1199.73</td>
<td>1235.9</td>
<td>1203.79</td>
<td>1146.22</td>
</tr>
<tr>
<td>minimum</td>
<td>1269.32</td>
<td>1268.88</td>
<td>1269.77</td>
<td>1197.96</td>
<td>1279.38</td>
<td>1166.42</td>
<td>1119.12</td>
<td>1115.14</td>
<td>1097.03</td>
</tr>
<tr>
<td>maximum</td>
<td>1367.79</td>
<td>1280.36</td>
<td>1294.03</td>
<td>1509.0</td>
<td>1333.55</td>
<td>1204.37</td>
<td>1251.24</td>
<td>1308.93</td>
<td>1146.53</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>-0.79 % </td>
<td>-2.37 % </td>
<td>-7.61 % </td>
<td>1.32 % </td>
<td>7.5 % </td>
<td>2.72 % </td>
<td>-0.94 % </td>
<td>1.79 % </td>
<td>-4.86 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.7287</td>
<td>0.3029</td>
<td>0.2581</td>
<td>0.8137</td>
<td>0.0353</td>
<td>0.1389</td>
<td>0.6776</td>
<td>0.6539</td>
<td>0.2137</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>DIFF</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
</tr>
</table>
<a name="524288"></a> 
<img src="524288.png" alt="524288" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>524288</td><td>1601.15</td><td>1744.46</td><td>1504.08</td><td>1442.0</td><td>1496.23</td><td>1345.78</td><td>1336.16</td><td>1342.0</td><td>1289.25</td></tr>
<tr><td>524288</td><td>1714.08</td><td>1713.37</td><td>1711.71</td><td>1486.31</td><td>1475.73</td><td>1356.78</td><td>1278.41</td><td>1307.5</td><td>1281.3</td></tr>
<tr><td>524288</td><td>1677.45</td><td>1684.76</td><td>1639.54</td><td>1415.85</td><td>1443.95</td><td>1300.62</td><td>1339.55</td><td>1248.06</td><td>1342.31</td></tr>
<tr><td>524288</td><td>1726.88</td><td>1684.09</td><td>1698.18</td><td>1435.84</td><td>1380.2</td><td>1308.25</td><td>1312.32</td><td>1248.79</td><td>1271.74</td></tr>
<tr><td>524288</td><td>1624.13</td><td>1495.59</td><td>1737.5</td><td>1456.08</td><td>1413.36</td><td>1392.59</td><td>1233.54</td><td>1242.42</td><td>1388.53</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1668.74</td>
<td>1664.46</td>
<td>1658.2</td>
<td>1447.22</td>
<td>1441.89</td>
<td>1340.8</td>
<td>1300.0</td>
<td>1277.75</td>
<td>1314.63</td>
</tr>
<tr>
<td>standard dev.</td>
<td>54.93</td>
<td>97.6</td>
<td>93.34</td>
<td>26.2</td>
<td>46.7</td>
<td>37.54</td>
<td>44.46</td>
<td>44.67</td>
<td>49.55</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1616.36</td>
<td>1571.4</td>
<td>1569.21</td>
<td>1422.23</td>
<td>1397.38</td>
<td>1305.02</td>
<td>1257.61</td>
<td>1235.16</td>
<td>1267.38</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1721.11</td>
<td>1757.51</td>
<td>1747.19</td>
<td>1472.2</td>
<td>1486.41</td>
<td>1376.59</td>
<td>1342.39</td>
<td>1320.34</td>
<td>1361.87</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1668.01</td>
<td>1662.06</td>
<td>1656.02</td>
<td>1447.03</td>
<td>1441.29</td>
<td>1340.39</td>
<td>1299.38</td>
<td>1277.14</td>
<td>1313.89</td>
</tr>
<tr>
<td>median</td>
<td>1677.45</td>
<td>1684.76</td>
<td>1698.18</td>
<td>1442.0</td>
<td>1443.95</td>
<td>1345.78</td>
<td>1312.32</td>
<td>1248.79</td>
<td>1289.25</td>
</tr>
<tr>
<td>first quartile</td>
<td>1624.13</td>
<td>1684.09</td>
<td>1639.54</td>
<td>1435.84</td>
<td>1413.36</td>
<td>1308.25</td>
<td>1278.41</td>
<td>1248.06</td>
<td>1281.3</td>
</tr>
<tr>
<td>third quartile</td>
<td>1714.08</td>
<td>1713.37</td>
<td>1711.71</td>
<td>1456.08</td>
<td>1475.73</td>
<td>1356.78</td>
<td>1336.16</td>
<td>1307.5</td>
<td>1342.31</td>
</tr>
<tr>
<td>minimum</td>
<td>1601.15</td>
<td>1495.59</td>
<td>1504.08</td>
<td>1415.85</td>
<td>1380.2</td>
<td>1300.62</td>
<td>1233.54</td>
<td>1242.42</td>
<td>1271.74</td>
</tr>
<tr>
<td>maximum</td>
<td>1726.88</td>
<td>1744.46</td>
<td>1737.5</td>
<td>1486.31</td>
<td>1496.23</td>
<td>1392.59</td>
<td>1339.55</td>
<td>1342.0</td>
<td>1388.53</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>524288</td><td>1792.28</td><td>1599.29</td><td>1675.27</td><td>1431.29</td><td>1472.4</td><td>1365.19</td><td>1323.68</td><td>1289.14</td><td>1338.63</td></tr>
<tr><td>524288</td><td>1612.92</td><td>1660.88</td><td>1756.72</td><td>1493.09</td><td>1439.68</td><td>1356.64</td><td>1296.95</td><td>1239.5</td><td>1297.1</td></tr>
<tr><td>524288</td><td>1632.78</td><td>1498.99</td><td>1504.53</td><td>1576.0</td><td>1401.23</td><td>1414.78</td><td>1246.71</td><td>1231.31</td><td>1348.58</td></tr>
<tr><td>524288</td><td>1696.26</td><td>1554.83</td><td>1707.55</td><td>1423.15</td><td>1489.22</td><td>1326.2</td><td>1244.27</td><td>1298.1</td><td>1298.89</td></tr>
<tr><td>524288</td><td>1523.55</td><td>1715.31</td><td>1558.36</td><td>1580.03</td><td>1422.66</td><td>1390.28</td><td>1247.56</td><td>1239.3</td><td>1233.81</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1651.56</td>
<td>1605.86</td>
<td>1640.49</td>
<td>1500.71</td>
<td>1445.04</td>
<td>1370.62</td>
<td>1271.83</td>
<td>1259.47</td>
<td>1303.4</td>
</tr>
<tr>
<td>standard dev.</td>
<td>100.04</td>
<td>85.26</td>
<td>105.41</td>
<td>75.59</td>
<td>35.88</td>
<td>33.67</td>
<td>36.4</td>
<td>31.51</td>
<td>45.24</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1556.18</td>
<td>1524.58</td>
<td>1539.99</td>
<td>1428.65</td>
<td>1410.83</td>
<td>1338.52</td>
<td>1237.13</td>
<td>1229.43</td>
<td>1260.27</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1746.94</td>
<td>1687.14</td>
<td>1740.98</td>
<td>1572.78</td>
<td>1479.24</td>
<td>1402.72</td>
<td>1306.53</td>
<td>1289.51</td>
<td>1346.53</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1649.15</td>
<td>1604.05</td>
<td>1637.74</td>
<td>1499.19</td>
<td>1444.68</td>
<td>1370.29</td>
<td>1271.42</td>
<td>1259.16</td>
<td>1302.76</td>
</tr>
<tr>
<td>median</td>
<td>1632.78</td>
<td>1599.29</td>
<td>1675.27</td>
<td>1493.09</td>
<td>1439.68</td>
<td>1365.19</td>
<td>1247.56</td>
<td>1239.5</td>
<td>1298.89</td>
</tr>
<tr>
<td>first quartile</td>
<td>1612.92</td>
<td>1554.83</td>
<td>1558.36</td>
<td>1431.29</td>
<td>1422.66</td>
<td>1356.64</td>
<td>1246.71</td>
<td>1239.3</td>
<td>1297.1</td>
</tr>
<tr>
<td>third quartile</td>
<td>1696.26</td>
<td>1660.88</td>
<td>1707.55</td>
<td>1576.0</td>
<td>1472.4</td>
<td>1390.28</td>
<td>1296.95</td>
<td>1289.14</td>
<td>1338.63</td>
</tr>
<tr>
<td>minimum</td>
<td>1523.55</td>
<td>1498.99</td>
<td>1504.53</td>
<td>1423.15</td>
<td>1401.23</td>
<td>1326.2</td>
<td>1244.27</td>
<td>1231.31</td>
<td>1233.81</td>
</tr>
<tr>
<td>maximum</td>
<td>1792.28</td>
<td>1715.31</td>
<td>1756.72</td>
<td>1580.03</td>
<td>1489.22</td>
<td>1414.78</td>
<td>1323.68</td>
<td>1298.1</td>
<td>1348.58</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>-1.03 % </td>
<td>-3.52 % </td>
<td>-1.07 % </td>
<td>3.7 % </td>
<td>0.22 % </td>
<td>2.22 % </td>
<td>-2.17 % </td>
<td>-1.43 % </td>
<td>-0.85 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.7451</td>
<td>0.3416</td>
<td>0.7856</td>
<td>0.1732</td>
<td>0.9079</td>
<td>0.2227</td>
<td>0.305</td>
<td>0.476</td>
<td>0.718</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
</tr>
</table>
<a name="1048576"></a> 
<img src="1048576.png" alt="1048576" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>1048576</td><td>1806.99</td><td>1772.62</td><td>1911.65</td><td>1600.25</td><td>1601.04</td><td>1476.83</td><td>1413.36</td><td>1405.41</td><td>1387.43</td></tr>
<tr><td>1048576</td><td>1785.75</td><td>1942.18</td><td>1814.86</td><td>1683.55</td><td>1588.16</td><td>1441.02</td><td>1358.73</td><td>1390.91</td><td>1370.93</td></tr>
<tr><td>1048576</td><td>1741.47</td><td>1881.23</td><td>1884.05</td><td>1610.21</td><td>1587.07</td><td>1483.39</td><td>1358.39</td><td>1394.06</td><td>1402.64</td></tr>
<tr><td>1048576</td><td>1747.3</td><td>1782.61</td><td>1793.94</td><td>1641.8</td><td>1507.83</td><td>1489.87</td><td>1351.17</td><td>1368.63</td><td>1386.37</td></tr>
<tr><td>1048576</td><td>1906.8</td><td>1905.72</td><td>1786.24</td><td>1660.75</td><td>1570.51</td><td>1436.37</td><td>1412.04</td><td>1396.21</td><td>1356.92</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1797.66</td>
<td>1856.87</td>
<td>1838.15</td>
<td>1639.31</td>
<td>1570.92</td>
<td>1465.49</td>
<td>1378.74</td>
<td>1391.04</td>
<td>1380.86</td>
</tr>
<tr>
<td>standard dev.</td>
<td>66.77</td>
<td>75.61</td>
<td>56.35</td>
<td>34.62</td>
<td>36.9</td>
<td>24.95</td>
<td>31.15</td>
<td>13.64</td>
<td>17.46</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1734.0</td>
<td>1784.79</td>
<td>1784.43</td>
<td>1606.3</td>
<td>1535.74</td>
<td>1441.71</td>
<td>1349.04</td>
<td>1378.04</td>
<td>1364.21</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1861.32</td>
<td>1928.96</td>
<td>1891.87</td>
<td>1672.32</td>
<td>1606.1</td>
<td>1489.28</td>
<td>1408.44</td>
<td>1404.05</td>
<td>1397.5</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1796.69</td>
<td>1855.64</td>
<td>1837.46</td>
<td>1639.02</td>
<td>1570.57</td>
<td>1465.32</td>
<td>1378.46</td>
<td>1390.99</td>
<td>1380.77</td>
</tr>
<tr>
<td>median</td>
<td>1785.75</td>
<td>1881.23</td>
<td>1814.86</td>
<td>1641.8</td>
<td>1587.07</td>
<td>1476.83</td>
<td>1358.73</td>
<td>1394.06</td>
<td>1386.37</td>
</tr>
<tr>
<td>first quartile</td>
<td>1747.3</td>
<td>1782.61</td>
<td>1793.94</td>
<td>1610.21</td>
<td>1570.51</td>
<td>1441.02</td>
<td>1358.39</td>
<td>1390.91</td>
<td>1370.93</td>
</tr>
<tr>
<td>third quartile</td>
<td>1806.99</td>
<td>1905.72</td>
<td>1884.05</td>
<td>1660.75</td>
<td>1588.16</td>
<td>1483.39</td>
<td>1412.04</td>
<td>1396.21</td>
<td>1387.43</td>
</tr>
<tr>
<td>minimum</td>
<td>1741.47</td>
<td>1772.62</td>
<td>1786.24</td>
<td>1600.25</td>
<td>1507.83</td>
<td>1436.37</td>
<td>1351.17</td>
<td>1368.63</td>
<td>1356.92</td>
</tr>
<tr>
<td>maximum</td>
<td>1906.8</td>
<td>1942.18</td>
<td>1911.65</td>
<td>1683.55</td>
<td>1601.04</td>
<td>1489.87</td>
<td>1413.36</td>
<td>1405.41</td>
<td>1402.64</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>1048576</td><td>1969.28</td><td>1846.99</td><td>1952.12</td><td>1724.48</td><td>1622.27</td><td>1542.19</td><td>1377.91</td><td>1338.57</td><td>1329.53</td></tr>
<tr><td>1048576</td><td>1961.42</td><td>1825.52</td><td>1833.09</td><td>1614.83</td><td>1548.84</td><td>1495.25</td><td>1356.54</td><td>1335.39</td><td>1384.8</td></tr>
<tr><td>1048576</td><td>1808.05</td><td>1831.82</td><td>1815.69</td><td>1730.46</td><td>1578.54</td><td>1481.87</td><td>1398.42</td><td>1368.07</td><td>1378.47</td></tr>
<tr><td>1048576</td><td>1829.62</td><td>1781.01</td><td>1914.28</td><td>1698.14</td><td>1566.89</td><td>1472.21</td><td>1351.38</td><td>1327.16</td><td>1377.45</td></tr>
<tr><td>1048576</td><td>1883.89</td><td>1863.81</td><td>1862.8</td><td>1650.1</td><td>1540.57</td><td>1481.41</td><td>1388.81</td><td>1342.67</td><td>1352.94</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1890.45</td>
<td>1829.83</td>
<td>1875.59</td>
<td>1683.6</td>
<td>1571.42</td>
<td>1494.59</td>
<td>1374.61</td>
<td>1342.37</td>
<td>1364.64</td>
</tr>
<tr>
<td>standard dev.</td>
<td>73.79</td>
<td>31.04</td>
<td>56.81</td>
<td>49.82</td>
<td>32.09</td>
<td>27.85</td>
<td>20.28</td>
<td>15.45</td>
<td>23.09</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1820.1</td>
<td>1800.24</td>
<td>1821.43</td>
<td>1636.1</td>
<td>1540.83</td>
<td>1468.03</td>
<td>1355.28</td>
<td>1327.64</td>
<td>1342.63</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1960.81</td>
<td>1859.43</td>
<td>1929.76</td>
<td>1731.1</td>
<td>1602.02</td>
<td>1521.14</td>
<td>1393.95</td>
<td>1357.1</td>
<td>1386.65</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1889.3</td>
<td>1829.62</td>
<td>1874.91</td>
<td>1683.01</td>
<td>1571.16</td>
<td>1494.38</td>
<td>1374.49</td>
<td>1342.3</td>
<td>1364.48</td>
</tr>
<tr>
<td>median</td>
<td>1883.89</td>
<td>1831.82</td>
<td>1862.8</td>
<td>1698.14</td>
<td>1566.89</td>
<td>1481.87</td>
<td>1377.91</td>
<td>1338.57</td>
<td>1377.45</td>
</tr>
<tr>
<td>first quartile</td>
<td>1829.62</td>
<td>1825.52</td>
<td>1833.09</td>
<td>1650.1</td>
<td>1548.84</td>
<td>1481.41</td>
<td>1356.54</td>
<td>1335.39</td>
<td>1352.94</td>
</tr>
<tr>
<td>third quartile</td>
<td>1961.42</td>
<td>1846.99</td>
<td>1914.28</td>
<td>1724.48</td>
<td>1578.54</td>
<td>1495.25</td>
<td>1388.81</td>
<td>1342.67</td>
<td>1378.47</td>
</tr>
<tr>
<td>minimum</td>
<td>1808.05</td>
<td>1781.01</td>
<td>1815.69</td>
<td>1614.83</td>
<td>1540.57</td>
<td>1472.21</td>
<td>1351.38</td>
<td>1327.16</td>
<td>1329.53</td>
</tr>
<tr>
<td>maximum</td>
<td>1969.28</td>
<td>1863.81</td>
<td>1952.12</td>
<td>1730.46</td>
<td>1622.27</td>
<td>1542.19</td>
<td>1398.42</td>
<td>1368.07</td>
<td>1384.8</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>5.16 % </td>
<td>-1.46 % </td>
<td>2.04 % </td>
<td>2.7 % </td>
<td>0.03 % </td>
<td>1.99 % </td>
<td>-0.3 % </td>
<td>-3.5 % </td>
<td>-1.17 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0706</td>
<td>0.4806</td>
<td>0.3259</td>
<td>0.1412</td>
<td>0.9823</td>
<td>0.1201</td>
<td>0.8103</td>
<td>0.0007</td>
<td>0.2456</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>DIFF</td>
<td>SAME</td>
</tr>
</table>
<a name="2097152"></a> 
<img src="2097152.png" alt="2097152" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>2097152</td><td>1987.6</td><td>1963.48</td><td>2049.78</td><td>1765.11</td><td>1619.35</td><td>1568.38</td><td>1452.48</td><td>1434.77</td><td>1441.31</td></tr>
<tr><td>2097152</td><td>2021.21</td><td>1992.8</td><td>1978.94</td><td>1742.44</td><td>1703.81</td><td>1557.78</td><td>1454.52</td><td>1425.16</td><td>1441.06</td></tr>
<tr><td>2097152</td><td>2041.17</td><td>1956.08</td><td>2022.04</td><td>1774.51</td><td>1618.14</td><td>1542.94</td><td>1424.03</td><td>1441.22</td><td>1418.67</td></tr>
<tr><td>2097152</td><td>1947.58</td><td>1987.64</td><td>2009.45</td><td>1723.6</td><td>1636.96</td><td>1571.24</td><td>1426.2</td><td>1436.33</td><td>1453.07</td></tr>
<tr><td>2097152</td><td>2028.54</td><td>1964.12</td><td>2045.64</td><td>1749.32</td><td>1615.53</td><td>1530.71</td><td>1458.29</td><td>1428.26</td><td>1452.28</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>2005.22</td>
<td>1972.82</td>
<td>2021.17</td>
<td>1751.0</td>
<td>1638.76</td>
<td>1554.21</td>
<td>1443.1</td>
<td>1433.15</td>
<td>1441.28</td>
</tr>
<tr>
<td>standard dev.</td>
<td>37.83</td>
<td>16.29</td>
<td>28.89</td>
<td>19.87</td>
<td>37.34</td>
<td>17.2</td>
<td>16.57</td>
<td>6.43</td>
<td>13.88</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1969.15</td>
<td>1957.29</td>
<td>1993.63</td>
<td>1732.06</td>
<td>1603.16</td>
<td>1537.81</td>
<td>1427.3</td>
<td>1427.01</td>
<td>1428.04</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>2041.29</td>
<td>1988.36</td>
<td>2048.72</td>
<td>1769.94</td>
<td>1674.35</td>
<td>1570.6</td>
<td>1458.9</td>
<td>1439.28</td>
<td>1454.52</td>
</tr>
<tr>
<td>geom. mean</td>
<td>2004.93</td>
<td>1972.77</td>
<td>2021.01</td>
<td>1750.91</td>
<td>1638.42</td>
<td>1554.13</td>
<td>1443.03</td>
<td>1433.14</td>
<td>1441.23</td>
</tr>
<tr>
<td>median</td>
<td>2021.21</td>
<td>1964.12</td>
<td>2022.04</td>
<td>1749.32</td>
<td>1619.35</td>
<td>1557.78</td>
<td>1452.48</td>
<td>1434.77</td>
<td>1441.31</td>
</tr>
<tr>
<td>first quartile</td>
<td>1987.6</td>
<td>1963.48</td>
<td>2009.45</td>
<td>1742.44</td>
<td>1618.14</td>
<td>1542.94</td>
<td>1426.2</td>
<td>1428.26</td>
<td>1441.06</td>
</tr>
<tr>
<td>third quartile</td>
<td>2028.54</td>
<td>1987.64</td>
<td>2045.64</td>
<td>1765.11</td>
<td>1636.96</td>
<td>1568.38</td>
<td>1454.52</td>
<td>1436.33</td>
<td>1452.28</td>
</tr>
<tr>
<td>minimum</td>
<td>1947.58</td>
<td>1956.08</td>
<td>1978.94</td>
<td>1723.6</td>
<td>1615.53</td>
<td>1530.71</td>
<td>1424.03</td>
<td>1425.16</td>
<td>1418.67</td>
</tr>
<tr>
<td>maximum</td>
<td>2041.17</td>
<td>1992.8</td>
<td>2049.78</td>
<td>1774.51</td>
<td>1703.81</td>
<td>1571.24</td>
<td>1458.29</td>
<td>1441.22</td>
<td>1453.07</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>2097152</td><td>2070.49</td><td>1991.6</td><td>1969.93</td><td>1743.1</td><td>1642.81</td><td>1602.32</td><td>1423.64</td><td>1398.01</td><td>1396.18</td></tr>
<tr><td>2097152</td><td>2045.99</td><td>1989.14</td><td>2022.31</td><td>1740.39</td><td>1622.54</td><td>1562.27</td><td>1432.78</td><td>1411.98</td><td>1412.25</td></tr>
<tr><td>2097152</td><td>1995.26</td><td>2008.42</td><td>1990.32</td><td>1771.29</td><td>1644.98</td><td>1561.32</td><td>1441.8</td><td>1409.63</td><td>1425.93</td></tr>
<tr><td>2097152</td><td>2039.45</td><td>1980.46</td><td>2065.59</td><td>1740.98</td><td>1669.42</td><td>1579.69</td><td>1455.93</td><td>1420.55</td><td>1400.05</td></tr>
<tr><td>2097152</td><td>1983.42</td><td>1967.92</td><td>2040.38</td><td>1760.53</td><td>1668.85</td><td>1584.04</td><td>1453.71</td><td>1418.31</td><td>1422.02</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>2026.92</td>
<td>1987.51</td>
<td>2017.71</td>
<td>1751.26</td>
<td>1649.72</td>
<td>1577.93</td>
<td>1441.57</td>
<td>1411.7</td>
<td>1411.29</td>
</tr>
<tr>
<td>standard dev.</td>
<td>36.45</td>
<td>14.92</td>
<td>38.28</td>
<td>13.94</td>
<td>19.77</td>
<td>17.0</td>
<td>13.71</td>
<td>8.86</td>
<td>13.09</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1992.17</td>
<td>1973.29</td>
<td>1981.21</td>
<td>1737.97</td>
<td>1630.87</td>
<td>1561.72</td>
<td>1428.5</td>
<td>1403.25</td>
<td>1398.81</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>2061.67</td>
<td>2001.73</td>
<td>2054.2</td>
<td>1764.55</td>
<td>1668.57</td>
<td>1594.14</td>
<td>1454.65</td>
<td>1420.14</td>
<td>1423.76</td>
</tr>
<tr>
<td>geom. mean</td>
<td>2026.66</td>
<td>1987.46</td>
<td>2017.42</td>
<td>1751.21</td>
<td>1649.63</td>
<td>1577.86</td>
<td>1441.52</td>
<td>1411.67</td>
<td>1411.24</td>
</tr>
<tr>
<td>median</td>
<td>2039.45</td>
<td>1989.14</td>
<td>2022.31</td>
<td>1743.1</td>
<td>1644.98</td>
<td>1579.69</td>
<td>1441.8</td>
<td>1411.98</td>
<td>1412.25</td>
</tr>
<tr>
<td>first quartile</td>
<td>1995.26</td>
<td>1980.46</td>
<td>1990.32</td>
<td>1740.98</td>
<td>1642.81</td>
<td>1562.27</td>
<td>1432.78</td>
<td>1409.63</td>
<td>1400.05</td>
</tr>
<tr>
<td>third quartile</td>
<td>2045.99</td>
<td>1991.6</td>
<td>2040.38</td>
<td>1760.53</td>
<td>1668.85</td>
<td>1584.04</td>
<td>1453.71</td>
<td>1418.31</td>
<td>1422.02</td>
</tr>
<tr>
<td>minimum</td>
<td>1983.42</td>
<td>1967.92</td>
<td>1969.93</td>
<td>1740.39</td>
<td>1622.54</td>
<td>1561.32</td>
<td>1423.64</td>
<td>1398.01</td>
<td>1396.18</td>
</tr>
<tr>
<td>maximum</td>
<td>2070.49</td>
<td>2008.42</td>
<td>2065.59</td>
<td>1771.29</td>
<td>1669.42</td>
<td>1602.32</td>
<td>1455.93</td>
<td>1420.55</td>
<td>1425.93</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>1.08 % </td>
<td>0.74 % </td>
<td>-0.17 % </td>
<td>0.02 % </td>
<td>0.67 % </td>
<td>1.53 % </td>
<td>-0.11 % </td>
<td>-1.5 % </td>
<td>-2.08 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.3827</td>
<td>0.1755</td>
<td>0.8757</td>
<td>0.9813</td>
<td>0.5777</td>
<td>0.0596</td>
<td>0.8777</td>
<td>0.0023</td>
<td>0.0079</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>DIFF</td>
<td>SAME</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="4194304"></a> 
<img src="4194304.png" alt="4194304" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>4194304</td><td>1954.18</td><td>1992.89</td><td>1981.56</td><td>1759.16</td><td>1612.96</td><td>1553.21</td><td>1408.84</td><td>1411.46</td><td>1409.0</td></tr>
<tr><td>4194304</td><td>1937.6</td><td>1965.87</td><td>1972.58</td><td>1710.61</td><td>1608.95</td><td>1528.26</td><td>1413.58</td><td>1399.21</td><td>1395.33</td></tr>
<tr><td>4194304</td><td>1968.08</td><td>1988.46</td><td>1973.0</td><td>1710.96</td><td>1600.47</td><td>1520.24</td><td>1422.8</td><td>1426.06</td><td>1390.76</td></tr>
<tr><td>4194304</td><td>1936.84</td><td>1989.88</td><td>1957.96</td><td>1720.83</td><td>1614.02</td><td>1538.25</td><td>1422.67</td><td>1409.3</td><td>1408.32</td></tr>
<tr><td>4194304</td><td>1934.45</td><td>1961.61</td><td>1965.93</td><td>1722.75</td><td>1597.67</td><td>1543.93</td><td>1422.01</td><td>1418.74</td><td>1401.64</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1946.23</td>
<td>1979.74</td>
<td>1970.21</td>
<td>1724.86</td>
<td>1606.81</td>
<td>1536.78</td>
<td>1417.98</td>
<td>1412.95</td>
<td>1401.01</td>
</tr>
<tr>
<td>standard dev.</td>
<td>14.51</td>
<td>14.77</td>
<td>8.81</td>
<td>19.96</td>
<td>7.38</td>
<td>12.94</td>
<td>6.41</td>
<td>10.12</td>
<td>7.98</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1932.4</td>
<td>1965.66</td>
<td>1961.81</td>
<td>1705.83</td>
<td>1599.77</td>
<td>1524.45</td>
<td>1411.87</td>
<td>1403.31</td>
<td>1393.4</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1960.06</td>
<td>1993.82</td>
<td>1978.61</td>
<td>1743.89</td>
<td>1613.85</td>
<td>1549.11</td>
<td>1424.09</td>
<td>1422.6</td>
<td>1408.62</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1946.19</td>
<td>1979.7</td>
<td>1970.19</td>
<td>1724.77</td>
<td>1606.8</td>
<td>1536.74</td>
<td>1417.97</td>
<td>1412.93</td>
<td>1400.99</td>
</tr>
<tr>
<td>median</td>
<td>1937.6</td>
<td>1988.46</td>
<td>1972.58</td>
<td>1720.83</td>
<td>1608.95</td>
<td>1538.25</td>
<td>1422.01</td>
<td>1411.46</td>
<td>1401.64</td>
</tr>
<tr>
<td>first quartile</td>
<td>1936.84</td>
<td>1965.87</td>
<td>1965.93</td>
<td>1710.96</td>
<td>1600.47</td>
<td>1528.26</td>
<td>1413.58</td>
<td>1409.3</td>
<td>1395.33</td>
</tr>
<tr>
<td>third quartile</td>
<td>1954.18</td>
<td>1989.88</td>
<td>1973.0</td>
<td>1722.75</td>
<td>1612.96</td>
<td>1543.93</td>
<td>1422.67</td>
<td>1418.74</td>
<td>1408.32</td>
</tr>
<tr>
<td>minimum</td>
<td>1934.45</td>
<td>1961.61</td>
<td>1957.96</td>
<td>1710.61</td>
<td>1597.67</td>
<td>1520.24</td>
<td>1408.84</td>
<td>1399.21</td>
<td>1390.76</td>
</tr>
<tr>
<td>maximum</td>
<td>1968.08</td>
<td>1992.89</td>
<td>1981.56</td>
<td>1759.16</td>
<td>1614.02</td>
<td>1553.21</td>
<td>1422.8</td>
<td>1426.06</td>
<td>1409.0</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>4194304</td><td>2024.01</td><td>2012.97</td><td>2059.58</td><td>1781.34</td><td>1646.38</td><td>1576.08</td><td>1427.35</td><td>1388.93</td><td>1391.64</td></tr>
<tr><td>4194304</td><td>2082.78</td><td>2056.59</td><td>2058.45</td><td>1781.37</td><td>1654.2</td><td>1579.69</td><td>1442.22</td><td>1403.25</td><td>1405.38</td></tr>
<tr><td>4194304</td><td>2024.76</td><td>2020.29</td><td>2045.61</td><td>1795.48</td><td>1650.14</td><td>1596.59</td><td>1429.48</td><td>1420.31</td><td>1416.73</td></tr>
<tr><td>4194304</td><td>2053.29</td><td>2052.98</td><td>2059.05</td><td>1790.89</td><td>1669.37</td><td>1594.79</td><td>1442.21</td><td>1410.35</td><td>1395.92</td></tr>
<tr><td>4194304</td><td>2027.96</td><td>2025.8</td><td>2048.26</td><td>1802.93</td><td>1672.28</td><td>1569.31</td><td>1431.56</td><td>1410.54</td><td>1415.79</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>2042.56</td>
<td>2033.73</td>
<td>2054.19</td>
<td>1790.4</td>
<td>1658.47</td>
<td>1583.29</td>
<td>1434.57</td>
<td>1406.67</td>
<td>1405.09</td>
</tr>
<tr>
<td>standard dev.</td>
<td>25.53</td>
<td>19.8</td>
<td>6.7</td>
<td>9.31</td>
<td>11.65</td>
<td>11.93</td>
<td>7.14</td>
<td>11.63</td>
<td>11.35</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>2018.22</td>
<td>2014.85</td>
<td>2047.8</td>
<td>1781.53</td>
<td>1647.36</td>
<td>1571.91</td>
<td>1427.76</td>
<td>1395.59</td>
<td>1394.27</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>2066.9</td>
<td>2052.6</td>
<td>2060.58</td>
<td>1799.28</td>
<td>1669.58</td>
<td>1594.67</td>
<td>1441.37</td>
<td>1417.76</td>
<td>1415.91</td>
</tr>
<tr>
<td>geom. mean</td>
<td>2042.43</td>
<td>2033.65</td>
<td>2054.18</td>
<td>1790.38</td>
<td>1658.44</td>
<td>1583.25</td>
<td>1434.55</td>
<td>1406.64</td>
<td>1405.05</td>
</tr>
<tr>
<td>median</td>
<td>2027.96</td>
<td>2025.8</td>
<td>2058.45</td>
<td>1790.89</td>
<td>1654.2</td>
<td>1579.69</td>
<td>1431.56</td>
<td>1410.35</td>
<td>1405.38</td>
</tr>
<tr>
<td>first quartile</td>
<td>2024.76</td>
<td>2020.29</td>
<td>2048.26</td>
<td>1781.37</td>
<td>1650.14</td>
<td>1576.08</td>
<td>1429.48</td>
<td>1403.25</td>
<td>1395.92</td>
</tr>
<tr>
<td>third quartile</td>
<td>2053.29</td>
<td>2052.98</td>
<td>2059.05</td>
<td>1795.48</td>
<td>1669.37</td>
<td>1594.79</td>
<td>1442.21</td>
<td>1410.54</td>
<td>1415.79</td>
</tr>
<tr>
<td>minimum</td>
<td>2024.01</td>
<td>2012.97</td>
<td>2045.61</td>
<td>1781.34</td>
<td>1646.38</td>
<td>1569.31</td>
<td>1427.35</td>
<td>1388.93</td>
<td>1391.64</td>
</tr>
<tr>
<td>maximum</td>
<td>2082.78</td>
<td>2056.59</td>
<td>2059.58</td>
<td>1802.93</td>
<td>1672.28</td>
<td>1596.59</td>
<td>1442.22</td>
<td>1420.31</td>
<td>1416.73</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>4.95 % </td>
<td>2.73 % </td>
<td>4.26 % </td>
<td>3.8 % </td>
<td>3.22 % </td>
<td>3.03 % </td>
<td>1.17 % </td>
<td>-0.44 % </td>
<td>0.29 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0001</td>
<td>0.0012</td>
<td>0.0</td>
<td>0.0002</td>
<td>0.0</td>
<td>0.0004</td>
<td>0.0048</td>
<td>0.389</td>
<td>0.5291</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>SAME</td>
<td>SAME</td>
</tr>
</table>

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